Optimized placement of vibration damper tools through mode-shape tuning

ABSTRACT

Systems and methods for damping torsional oscillations of downhole systems are described. The systems include a downhole drilling system disposed at an end of the downhole system in operative connection with a drill bit. A damping system is installed on the downhole drilling system, the damping system having at least one damper element configured to dampen at least one HFTO mode. At least one mode-shape tuning element is arranged on the drilling system. The at least one mode-shape tuning element is configured and positioned on the drilling system to modify at least one of a shape of the HFTO mode, a frequency of the HFTO mode, an excitability of the HFTO mode, and a damping efficiency of the at least one damper element.

CROSS-REFERENCE TO RELATED APPLICATION

This application claims the benefit of U.S. Provisional Application Ser. No. 62/899,354, filed Sep. 12, 2019, U.S. Provisional Application Ser. No. 62/899,291, filed Sep. 12, 2019, U.S. Provisional Application Ser. No. 62/899,331, filed Sep. 12, 2019, and U.S. Provisional Application Ser. No. 62/899,332, filed Sep. 12, 2019, the entire disclosures of which are incorporated herein by reference.

BACKGROUND 1. Field of the Invention

The present invention generally relates to downhole operations and systems for damping vibrations of the downhole systems during operation.

2. Description of the Related Art

Boreholes are drilled deep into the earth for many applications such as carbon dioxide sequestration, geothermal production, and hydrocarbon exploration and production. In all of the applications, the boreholes are drilled such that they pass through or allow access to a material (e.g., a gas or fluid) contained in a formation (e.g., a compartment) located below the earth's surface. Different types of tools and instruments may be disposed in the boreholes to perform various tasks and measurements.

In operation, the downhole components may be subject to vibrations that can impact operational efficiencies. For example, severe vibrations in drillstrings and bottomhole assemblies can be caused by cutting forces at the drill bit or mass imbalances in downhole tools such as mud motors. Impacts from such vibrations can include, but are not limited to, reduced rate of penetration, reduced quality of measurements, and excess fatigue and wear on downhole components, tools, and/or devices.

SUMMARY

Disclosed herein are systems and methods for damping oscillations, such as torsional oscillations, of downhole systems. The systems include a downhole system arranged to rotate within a borehole and a damping system configured on the downhole system. The damping system includes one or more dampers that is installed at or in a drill bit or other disintegration device of the downhole system. The dampers are arranged to reduce or eliminate one or more specific vibration modes, and thus improved downhole operations and/or efficiencies may be achieved.

According to some embodiments, systems for damping torsional oscillations of downhole systems are provided. The systems include a drilling system comprising a bottomhole assembly disposed on the end of a drill string, at least one mode-shape tuning element arranged on the drilling system, the at least one mode-shape tuning element configured to shift the location of a maxima of a high-frequency torsional oscillations (HFTO) mode, and a damping system configured on the drilling system, the damping system comprising at least one damper element arranged at the shifted location of the maxima.

According to some embodiments, methods of damping torsional oscillations of a downhole system in a borehole are provided. The methods include installing at least one mode-shape tuning element on a drilling system, the drilling system comprising a drill string and a bottomhole assembly, the at least one mode-shape tuning element configured to shift the location of a maxima of a high-frequency torsional oscillations (HFTO) mode of the drilling system and installing a damping system on the drilling system, the damping system comprising at least one damper element arranged at the shifted location of the maxima.

BRIEF DESCRIPTION OF THE DRAWINGS

The subject matter, which is regarded as the invention, is particularly pointed out and distinctly claimed in the claims at the conclusion of the specification. The foregoing and other features and advantages of the invention are apparent from the following detailed description taken in conjunction with the accompanying drawings, wherein like elements are numbered alike, in which:

FIG. 1 is an example of a system for performing downhole operations that can employ embodiments of the present disclosure;

FIG. 2 is an illustrative plot of a typical curve of frictional force or torque versus relative velocity or relative rotational speed between two interacting bodies;

FIG. 3 is a hysteresis plot of a friction force versus displacement for a positive relative mean velocity with additional small velocity fluctuations;

FIG. 4 is a plot of friction force, relative velocity, and a product of both versus. time for a positive relative mean velocity with additional small velocity fluctuations;

FIG. 5 is a hysteresis plot of a friction force versus displacement for a relative mean velocity of zero with additional small velocity fluctuations;

FIG. 6 is a plot of friction force, relative velocity, and a product of both for a relative mean velocity of zero with additional small velocity fluctuations;

FIG. 7 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 8A is a plot of tangential acceleration measured at a drill bit;

FIG. 8B is a plot corresponding to FIG. 8A illustrating rotary speed;

FIG. 9A is a schematic plot of a downhole system illustrating a shape of a downhole system as a function of distance-from-bit;

FIG. 9B illustrates example corresponding mode shapes of torsional vibrations that may be excited during operation of the downhole system of FIG. 9A;

FIG. 10 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 11 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 12 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 13 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 14 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 15 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 16 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 17 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 18 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure;

FIG. 19 is a schematic illustration of a damping system in accordance with an embodiment of the present disclosure; and

FIG. 20 is a schematic plot of a modal damping ratio versus local vibration amplitude;

FIG. 21 is a schematic illustration of a downhole tool having a damping system;

FIG. 22 is a cross-sectional illustration of the downhole tool of FIG. 21;

FIG. 23 is a set of plots illustrating mode shapes of various BHA modes and normalized damping for a damper in accordance with an embodiment of the present disclosure;

FIGS. 24A-24C are schematic illustrations of the placement of a single damper element on a downhole in accordance with embodiments of the present disclosure;

FIG. 25 is a set of plots illustrating mode shapes of various BHA modes and normalized damping for a damper in accordance with an embodiment of the present disclosure;

FIG. 26A is a schematic illustration of a downhole string having mode-shape tuning elements and a damper element installed thereon in accordance with an embodiment of the present disclosure;

FIG. 26B illustrates modified or tuned mode shapes by incorporation of mode-shape tuning elements in accordance with an embodiment of the present disclosure;

FIG. 27 is a schematic illustration of a tangential damper element in accordance with an embodiment of the present disclosure;

FIG. 28 is a schematic illustration of a tangential damper element in accordance with an embodiment of the present disclosure;

FIG. 29A is a schematic illustration of examples of mode-shape tuning elements in accordance with an embodiment of the present disclosure; and

FIG. 29B is a schematic illustration of an example assembly downhole string having mode-shape tuning elements and a damper element sub in accordance with an embodiment of the present disclosure.

DETAILED DESCRIPTION

FIG. 1 shows a schematic diagram of a system for performing downhole operations. As shown, the system is a drilling system 10 that includes a drill string 20 having a drilling assembly 90, also referred to as a bottomhole assembly (BHA), conveyed in a borehole 26 penetrating an earth formation 60. The drilling system 10 includes a conventional derrick 11 erected on a floor 12 that supports a rotary table 14 that is rotated by a prime mover, such as an electric motor (not shown), at a desired rotational speed. The drill string 20 includes a drilling tubular 22, such as a drill pipe, extending downward from the rotary table 14 into the borehole 26. A disintegration device 50, such as a drill bit (also referred to as “bit”) attached to the end of the BHA 90, disintegrates the geological formations when it is rotated to drill the borehole 26. The drill string 20 is coupled to surface equipment such as systems for lifting, rotating, and/or pushing, including, but not limited to, a drawworks 30 via a kelly joint 21, swivel 28 and line 29 through a pulley 23. In some embodiments, the surface equipment may include a top drive (not shown). During the drilling operations, the drawworks 30 is operated to control the weight on bit, which affects the rate of penetration. The operation of the drawworks 30 is well known in the art and is thus not described in detail herein.

During drilling operations, a suitable drilling fluid 31 (also referred to as the “mud”) from a source or mud pit 32 is circulated under pressure through the drill string 20 by a mud pump 34. The drilling fluid 31 passes into the drill string 20 via a desurger 36, fluid line 38 and the kelly joint 21. The drilling fluid 31 is discharged at the borehole bottom 51 through an opening in the disintegration device 50. The drilling fluid 31 circulates uphole through the annular space 27 between the drill string 20 and the borehole 26 and returns to the mud pit 32 via a return line 35. A sensor S1 in the fluid line 38 provides information about the fluid flow rate. A surface torque sensor S2 and a sensor S3 associated with the drill string 20 respectively provide information about the torque and the rotational speed of the drill string. Additionally, one or more sensors (not shown) associated with line 29 are used to provide the hook load of the drill string 20 and about other desired parameters relating to the drilling of the borehole 26. The system may further include one or more downhole sensors 70 located on the drill string 20 and/or the BHA 90.

In some applications the disintegration device 50 is rotated by only rotating the drill pipe 22. However, in other applications, a drilling motor 55 (for example, a mud motor) disposed in the drilling assembly 90 is used to rotate the disintegration device 50 and/or to superimpose or supplement the rotation of the drill string 20. In either case, the rate of penetration (ROP) of the disintegration device 50 into the earth formation 60 for a given formation and a given drilling assembly largely depends upon the weight on bit and the drill bit rotational speed. In one aspect of the embodiment of FIG. 1, the drilling motor 55 is coupled to the disintegration device 50 via a drive shaft (not shown) disposed in a bearing assembly 57. The drilling motor 55 rotates the disintegration device 50 when the drilling fluid 31 passes through the drilling motor 55 under pressure. The bearing assembly 57 supports the radial and axial forces of the disintegration device 50, the downthrust of the drilling motor and the reactive upward loading from the applied weight on bit. Stabilizers 58 coupled to the bearing assembly 57 and/or other suitable locations act as centralizers for the drilling assembly 90 or portions thereof.

A surface control unit 40 receives signals from the downhole sensors 70 and devices via a transducer 43, such as a pressure transducer, placed in the fluid line 38 as well as from sensors S1, S2, S3, hook load sensors, RPM sensors, torque sensors, and any other sensors used in the system and processes such signals according to programmed instructions provided to the surface control unit 40. The surface control unit 40 displays desired drilling parameters and other information on a display/monitor 42 for use by an operator at the rig site to control the drilling operations. The surface control unit 40 contains a computer, memory for storing data, computer programs, models and algorithms accessible to a processor in the computer, a recorder, such as tape unit, memory unit, etc. for recording data and other peripherals. The surface control unit 40 also may include simulation models for use by the computer to processes data according to programmed instructions. The control unit responds to user commands entered through a suitable device, such as a keyboard. The surface control unit 40 is adapted to activate alarms 44 when certain unsafe or undesirable operating conditions occur.

The drilling assembly 90 also contains other sensors and devices or tools for providing a variety of measurements relating to the formation surrounding the borehole and for drilling the borehole 26 along a desired path. Such devices may include a device for measuring the formation resistivity near and/or in front of the drill bit, a gamma ray device for measuring the formation gamma ray intensity and devices for determining the inclination, azimuth and position of the drill string. A formation resistivity tool 64, made according an embodiment described herein may be coupled at any suitable location, including above a lower kick-off subassembly 62, for estimating or determining the resistivity of the formation near or in front of the disintegration device 50 or at other suitable locations. An inclinometer 74 and a gamma ray device 76 may be suitably placed for respectively determining the inclination of the BHA and the formation gamma ray intensity. Any suitable inclinometer and gamma ray device may be utilized. In addition, an azimuth device (not shown), such as a magnetometer or a gyroscopic device, may be utilized to determine the drill string azimuth. Such devices are known in the art and therefore are not described in detail herein. In the above-described exemplary configuration, the drilling motor 55 transfers power to the disintegration device 50 via a shaft that also enables the drilling fluid to pass from the drilling motor 55 to the disintegration device 50. In an alternative embodiment of the drill string 20, the drilling motor 55 may be coupled below the resistivity measuring device 64 or at any other suitable place.

Still referring to FIG. 1, other logging-while-drilling (LWD) devices (generally denoted herein by numeral 77), such as devices for measuring formation porosity, permeability, density, rock properties, fluid properties, etc. may be placed at suitable locations in the drilling assembly 90 for providing information useful for evaluating the subsurface formations along borehole 26. Such devices may include, but are not limited to, temperature measurement tools, pressure measurement tools, borehole diameter measuring tools (e.g., a caliper), acoustic tools, nuclear tools, nuclear magnetic resonance tools and formation testing and sampling tools.

The above-noted devices transmit data to a downhole telemetry system 72, which in turn transmits the received data uphole to the surface control unit 40. The downhole telemetry system 72 also receives signals and data from the surface control unit 40 and transmits such received signals and data to the appropriate downhole devices. In one aspect, a mud pulse telemetry system may be used to communicate data between the downhole sensors 70 and devices and the surface equipment during drilling operations. A transducer 43 placed in the fluid line 38 (e.g., mud supply line) detects the mud pulses responsive to the data transmitted by the downhole telemetry system 72. Transducer 43 generates electrical signals in response to the mud pressure variations and transmits such signals via a conductor 45 to the surface control unit 40. In other aspects, any other suitable telemetry system may be used for two-way data communication (e.g., downlink and uplink) between the surface and the BHA 90, including but not limited to, an acoustic telemetry system, an electro-magnetic telemetry system, an optical telemetry system, a wired pipe telemetry system which may utilize wireless couplers or repeaters in the drill string or the borehole. The wired pipe telemetry system may be made up by joining drill pipe sections, wherein each pipe section includes a data communication link, such as a wire, that runs along the pipe. The data connection between the pipe sections may be made by any suitable method, including but not limited to, hard electrical or optical connections, induction, capacitive, resonant coupling, such as electromagnetic resonant coupling, or directional coupling methods. In case a coiled-tubing is used as the drill pipe 22, the data communication link may be run along a side of the coiled-tubing.

The drilling system described thus far relates to those drilling systems that utilize a drill pipe to convey the drilling assembly 90 into the borehole 26, wherein the weight on bit is controlled from the surface, typically by controlling the operation of the drawworks. However, a large number of the current drilling systems, especially for drilling highly deviated and horizontal boreholes, utilize coiled-tubing for conveying the drilling assembly downhole. In such application a thruster is sometimes deployed in the drill string to provide the desired force on the drill bit. Also, when coiled-tubing is utilized, the tubing is not rotated by a rotary table but instead it is injected into the borehole by a suitable injector while the downhole motor, such as drilling motor 55, rotates the disintegration device 50. For offshore drilling, an offshore rig or a vessel is used to support the drilling equipment, including the drill string.

Still referring to FIG. 1, a resistivity tool 64 may be provided that includes, for example, a plurality of antennas including, for example, transmitters 66 a or 66 b and/or receivers 68 a or 68 b. Resistivity can be one formation property that is of interest in making drilling decisions. Those of skill in the art will appreciate that other formation property tools can be employed with or in place of the resistivity tool 64.

Liner drilling can be one configuration or operation used for providing a disintegration device becomes more and more attractive in the oil and gas industry as it has several advantages compared to conventional drilling. One example of such configuration is shown and described in commonly owned U.S. Pat. No. 9,004,195, entitled “Apparatus and Method for Drilling a Borehole, Setting a Liner and Cementing the Borehole During a Single Trip,” which is incorporated herein by reference in its entirety. Importantly, despite a relatively low rate of penetration, the time of getting the liner to target is reduced because the liner is run in-hole while drilling the borehole simultaneously. This may be beneficial in swelling formations where a contraction of the drilled well can hinder an installation of the liner later on. Furthermore, drilling with liner in depleted and unstable reservoirs minimizes the risk that the pipe or drill string will get stuck due to borehole collapse.

Although FIG. 1 is shown and described with respect to a drilling operation, those of skill in the art will appreciate that similar configurations, albeit with different components, can be used for performing different downhole operations. For example, wireline, wired pipe, liner drilling, reaming, coiled tubing, and/or other configurations can be used as known in the art. Further, production configurations can be employed for extracting and/or injecting materials from/into earth formations. Thus, the present disclosure is not to be limited to drilling operations but can be employed for any appropriate or desired downhole operation(s).

Severe vibrations in drillstrings and bottomhole assemblies during drilling operations can be caused by cutting forces at the drill bit or mass imbalances in downhole tools such as drilling motors. Such vibrations can result in reduced rate of penetration, reduced quality of measurements made by tools of the bottomhole assembly, and can result in wear, fatigue, and/or failure of downhole components. As appreciated by those of skill in the art, different vibrations exist, such as lateral vibrations, axial vibrations, and torsional vibrations. For example, stick/slip of the whole drilling system and high-frequency torsional oscillations (“HFTO”) are both types of torsional vibrations. The terms “vibration,” “oscillation,” as well as “fluctuation,” are used with the same broad meaning of repeated and/or periodic movements or periodic deviations from a mean value, such as a mean position, a mean velocity, a mean acceleration, a mean force, and/or a mean torque. In particular, these terms are not meant to be limited to harmonic deviations, but may include all kinds of deviations, such as, but not limited to periodic, harmonic, and statistical deviations. Torsional vibrations may be excited by self-excitation mechanisms that occur due to the interaction of the drill bit or any other cutting structure such as a reamer bit and the formation. The main differentiator between low frequency torsional oscillations (such as stick/slip) and HFTO is the frequency and typical mode shapes: For example, HFTO have a frequency that is typically above 50 Hz compared to low frequency torsional vibrations that typically have frequencies below 1 Hz. Moreover, the excited mode shape of low frequency torsional vibrations or stick/slip is typically a first mode shape of the whole drilling system whereas the mode shape of HFTO can be of higher order and are commonly localized to smaller portions of the drilling system with comparably high amplitudes at the point of excitation that may be the drill bit or any other cutting structure (such as a reamer bit), or any contact between the drilling system and the formation (e.g., by a stabilizer).

Due to the high frequency of the vibrations, HFTO correspond to high acceleration and torque values along the BHA. Those skilled in the art will appreciate that for torsional movements, one of acceleration, force, and torque is always accompanied by the other two of acceleration, force, and torque. In that sense, acceleration, force, and torque are equivalent in the sense that none of these can occur without the other two. The loads of high frequency vibrations can have negative impacts on efficiency, reliability, and/or durability of electronic and mechanical parts of the BHA. Embodiments provided herein are directed to providing torsional vibration damping upon the downhole system to mitigate HFTO. In some embodiments of the present disclosure, the torsional vibration damping can be activated if a threshold of a measured property, such as a torsional vibration amplitude or frequency is achieved within the system.

In accordance with a non-limiting embodiment provided herein, a vibration damper, or in the context of this disclosure simply a damper, also known as a damping system, e.g. a torsional vibration damping system, may be based on friction dampers. For example, according to some embodiments, the damper may comprise one or more damper elements that may be included in a damper element sub. Friction between two parts within the damper element, such as two interacting bodies in the damper element can dissipate energy and reduce the level of torsional oscillations, thus mitigating the potential damage caused by high frequency vibrations. Preferably, the energy dissipation of the damper is at least equal to the HFTO energy input caused by the bit-rock interaction.

Friction dampers, as provided herein, can lead to a significant energy dissipation and thus mitigation of torsional vibrations. When two components or interacting bodies are in contact with each other and move relative to each other, a friction force acts in the opposite direction of the velocity of the relative movement between the contacting surfaces of the components or interacting bodies. The friction force leads to a dissipation of energy.

FIG. 2 is an illustrative plot 200 of a typical curve of the friction force or torque versus relative velocity ν (e.g., or relative rotational speed) between two interacting bodies. The two interacting bodies have a contact surface and a force component F_(N) perpendicular to the contact surface engaging the two interacting bodies. Plot 200 illustrates the dependency of friction force or torque of the two interacting bodies with a velocity-weakening behavior (e.g., frictional, the characteristic of cutting). At higher relative velocities (ν>0) between the two interacting bodies, the friction force or torque has a distinct value, illustrated by point 202. Decreasing the relative velocity will lead to an increasing friction force or torque (also referred to as velocity-weakening characteristic). The friction force or torque reaches its maximum when the relative velocity is zero. The maximum friction force is also known as static friction, sticking friction, or stiction.

Generally, friction force F_(R) depends on the normal force as described in the equation F_(R)=μ·F_(N), with friction coefficient μ. Generally, the friction coefficient μ is a function of velocity. Herein, the normal force can also be fluctuating corresponding to an excited vibration in the normal direction. In the case that the relative speed between two interacting bodies is zero (ν=0), the static friction force F_(S) is related to the normal force component F_(N) by the equation F_(S)=μ₀·F_(N) with the static friction coefficient μ₀. In the case that the relative speed between the two interacting bodies is not zero (ν≠0), the friction coefficient is known as dynamic friction coefficient μ. If the relative velocity is further decreased to negative values (i.e., if the direction the relative movement of the two interacting bodies is switched to the opposite), the friction force or torque switches to the opposite direction with a high absolute value corresponding to a step from a positive maximum to a negative minimum at point 204 in plot 200. That is, the friction force versus velocity shows a sign change at the point where the velocity changes the sign and is discontinuous at point 204 in plot 200. Velocity-weakening characteristic is a well-known effect between interacting bodies that are frictionally connected. The velocity-weakening characteristic of the contact force or torque is assumed to be a potential root cause for stick/slip. Velocity-weakening characteristic may also be achieved by utilizing dispersive fluid with a higher viscosity at lower relative velocities and a lower viscosity at higher relative velocities. If a dispersive fluid is forced through a relatively small channel, the same effect can be achieved in that the flow resistance is relatively high or low at low or high relative velocities, respectively.

With reference to FIGS. 8A-8B, FIG. 8A illustrates measured torsional acceleration of a downhole system versus time. In the 5 second measurement time shown in FIG. 8A, FIG. 8A shows oscillating torsional acceleration with a mean acceleration of approximately 0 g, overlayed by oscillating torsional accelerations with a relatively low amplitude between approximately 0 s and 3 s and relatively high amplitudes up to 100 g between approximately 3 s and 5 s. FIG. 8B illustrates the corresponding rotary velocity in the same time period as in FIG. 8A. In accordance with FIG. 8A, FIG. 8B illustrates a mean velocity ν₀ (indicated by the line ν₀ in FIG. 8B) which is relatively constant at approximately 190 rev/min. The mean velocity is overlayed by oscillating rotary velocity variations with relatively low amplitudes between approximately 0 s and 3 s and relatively high amplitudes between approximately 3 s and 5 s in accordance with the relatively low and high acceleration amplitudes in FIG. 8A. Notably, the oscillating rotary speed does not lead to negative values of the rotary velocity, even not in the time period between approximately 3 s and 5 s when the amplitudes of the rotary speed oscillations are relatively high.

Referring again to FIG. 2, point 202 illustrates a mean velocity of the two interacting bodies that is according to the mean velocity ν₀ in FIG. 8B. In the schematic illustration of FIG. 2, the data of FIG. 8B corresponds to a point with a velocity oscillating with relatively high frequency due to HTFO around the mean velocity ν₀ that varies relatively slowly with time compared to the HFTO. The point illustrating the data of FIG. 8B therefore moves back and forth on the positive branch of the curve in FIG. 2 without or only rarely reaching negative velocity values. Accordingly, the corresponding friction force or torque oscillates around a positive mean friction force or mean friction torque and is generally positive or only rarely reaches negative values. As discussed further below, the point 202 illustrates where a positive mean value of the relative velocity corresponds to a static torque and the point 204 illustrates a favorable point for friction damping. It is noted that friction forces or torque between the drilling system and the borehole wall will not generate additional damping of high frequency oscillations in the system. This is because the relative velocity between the contact surfaces of the interacting bodies (e.g., a stabilizer and the borehole wall) does not have a mean velocity that is so close to zero that the HFTO lead to a sign change of the relative velocity of the two interacting bodies. Rather, the relative velocity between the two interacting bodies has a high mean value at a distance from zero that is large so that the HFTO do not lead to a sign change of the relative velocity of the two interacting bodies (e.g., illustrated by point 202 in FIG. 2).

As will be appreciated by those of skill in the art, the weakening characteristic of the contact force or torque with respect to the relative velocity as illustrated in FIG. 2, leads to an application of energy into the system for oscillating relative movements of the interacting bodies with a mean velocity ν₀ that is high compared to the velocity of the oscillating movement. In this context, other examples of self-excitation mechanisms such as coupling between axial and torsional degree of freedom could lead to a similar characteristic.

The corresponding hysteresis is depicted in FIG. 3 and the time plot for the friction force and velocity is shown in FIG. 4. FIG. 3 illustrates hysteresis of a friction force F_(r), sometimes also referred to as a cutting force in this context, versus displacement relative to a location that is moving with a positive mean relative velocity with additional small velocity fluctuations leading to additional small displacement dx. Accordingly, FIG. 4 illustrates the friction force (F_(r)), relative velocity

$\left( \frac{dx}{d\; \tau} \right),$

and a product of both (indicated by label 400 in FIG. 4) for a positive mean relative velocity with additional small velocity fluctuations leading to additional small displacement dx. Those skilled in the art, will appreciate that the area between the friction force and the velocity over time is equal to the dissipated energy (i.e., the area between the line 400 and the zero axis), which is negative in the case that is illustrated by FIG. 3 and FIG. 4. That is, in the case illustrated by FIGS. 3 and 4, energy is transferred into the oscillation from the friction via the frictional contact.

Referring again to FIG. 2, the point 204 denotes the favorable mean velocity for friction damping of small velocity fluctuations or vibrations in addition to the mean velocity. For small fluctuations of the relative movement between the two interacting bodies, the discontinuity at point 204 in FIG. 2 with the sign change of the relative velocity of the interacting bodies also leads to an abrupt sign change of the friction force or torque. This sign change leads to a hysteresis that leads to a large amount of dissipated energy. For example, compare FIGS. 5 and 6, which are similar plots to FIGS. 3 and 4, respectively, but illustrate the case of zero mean relative velocity with additional small velocity fluctuations or vibrations. The area below the line 600 in FIG. 6 that corresponds to the product

$F_{r} \cdot \frac{dx}{d\; \tau}$

is equal to the dissipated energy during one period and is, in this case, positive. That is, in the case illustrated by FIGS. 5 and 6, the energy is transferred from the high frequency oscillation via the frictional contact into the friction. The effect is comparably high compared to the case illustrated by FIGS. 3 and 4 and has the desired sign. It is also clear from the comparison of FIGS. 2, 5, and 6 that the dissipated energy significantly depends on the difference between maximum friction force and minimum friction force for ν=0 (i.e., location 204 in FIG. 2). The higher the difference between maximum friction force and minimum friction force for ν=0, the higher is the dissipated energy. While FIGS. 3-4 were generated by using velocity weakening characteristics, such as the one shown in FIG. 2, embodiments of the present disclosure are not limited to such type of characteristics. The apparatuses and methods disclosed herein will be functional for any type of characteristic provided that the friction force or torque undergoes a step with a sign change when the relative velocity between the two interacting bodies changes its sign.

Friction dampers in accordance with some embodiments of the present disclosure will now be described. The friction dampers are installed on or in a drilling system, such as drilling system 10 shown in FIG. 1, and/or are part of drilling system 10, such as part of the bottomhole assembly 90. Friction damper elements are part of friction dampers and may comprise two interacting bodies, such as a first element and a second element having a frictional contact surface with the first element. The friction dampers of the present disclosure are arranged so that the first element has a mean velocity that is related to the rotary speed of the drilling system to which it is installed. For example, the first element may have a similar or the same mean velocity or rotary speed as the drilling system, so that small fluctuating oscillations lead to a sign change or zero crossing of the relative velocity between the first element and second element according to point 204 in FIG. 2.

It is noted that friction forces or torque between the drilling system and the borehole wall will not generate additional damping of high frequency oscillations in the system. This is because the relative velocity between the contact surfaces (e.g., a stabilizer and the borehole) does not have a zero mean value (e.g., point 202 in FIG. 2). In accordance with embodiments described herein, the static friction between the first element and the second element are set to be high enough to enable the first element to accelerate the second element (during rotation) to a mean velocity ν₀ with the same value as the drilling system. Additional high frequency oscillations, therefore, introduce slipping between the first element and the second element with positive or negative velocities according to oscillations around a position in FIG. 2 that is equal to or close to point 204 in FIG. 2. Slipping occurs if the inertial force F₁ exceeds the static friction force, expressed as the static friction coefficient multiplied by the normal force between the two interacting bodies: F₁>μ₀·F_(N). In accordance with embodiments of the present disclosure, the normal force F_(N) (e.g. caused by the contact and surface pressure of the contact surface between the two interacting bodies) and the static friction coefficient μ₀ are adjusted to achieve an optimal energy dissipation and an optimal amplitude. Further, the moment of inertia (torsional), the contact and surface pressure of the contacting surfaces, and the placement of the damper or contact surface with respect to the distance from bit may be optimized.

For example, turning to FIG. 7, a schematic illustration of a damping system 700 in accordance with an embodiment of the present disclosure is shown. The damping system 700 is part of a downhole system 702, such as a bottomhole assembly and/or a drilling assembly. The downhole system 702 includes a string 704 that is rotated to enable a drilling operation of the downhole system 702 to form a borehole 706 within a formation 708. As discussed above, the borehole 706 is typically filled with drilling fluid, such as drilling mud. The damping system 700 includes a first element 710 that is operatively coupled, e.g. fixedly connected or an integral part of the downhole system 702, so as to ensure that the first element 710 rotates with a mean velocity that is related to, e.g. similar to or same as the mean velocity of the downhole system 702. The first element 710 is in frictional contact with a second element 712. The second element 712 is at least partially movably mounted on the downhole system 702, with a contact surface 714 located between the first element 710 and the second element 712.

In the case of frictional forces, the difference between the minimum and maximum friction force is positively dependent on the normal force and the static friction coefficient. The dissipated energy increases with friction force and the harmonic displacement, but, only in a slip phase, energy is dissipated. In a sticking phase, the relative displacement between the friction interfaces and the dissipated energy is zero. The upper amplitude limit of the sticking phase increases linearly with the normal force and the friction coefficient in the contact interface. The reason is that the reactive force in the contact interface, J{umlaut over (x)}≥M_(H)=F_(N)μ_(H)r, that can be caused by the moment of inertia J of one of the contacting bodies if it is accelerated with z has to be higher than the torque M_(H)=F_(N)μ_(H)r that defines the limit between sticking and slipping. As used herein, F_(N) is the normal force and μ_(H) is the effective friction coefficient and r is the effective or mean radius of the friction contact area. For complex frictional contacts parts of the interacting bodies, sticking or slipping can occur at the same time. Herein the contact pressure can be optimized to achieve an optimal damping and amplitude.

Similar mechanisms apply if the contact force is caused by a displacement and spring element. The acceleration {umlaut over (x)} of the contact area can be due to an excitation of a mode and is dependent upon the corresponding mode shape, as further discussed below with respect to FIG. 9B. In case of an attached inertial mass (or simply inertia or mass within the context of this disclosure) with moment of inertia J the acceleration {umlaut over (x)} is equal to the acceleration of the excited mode and corresponding mode shape at the attachment position as long as the contact interface is sticking.

The normal force and friction force have to be adjusted to guarantee a slipping phase in an adequate or tolerated amplitude range. A tolerated amplitude range can be defined by an amplitude that is between zero and the limits of loads that are, for example, given by design specifications of tools and components. A limit could also be given by a percentage of the expected amplitude without the damper. The dissipated energy that can be compared to the energy input, e.g., by a forced or self-excitation, is one measure to judge the efficiency of a damper. Another measure is the provided equivalent damping of the system that is proportional to the ratio of the dissipated energy in one period of a harmonic vibration to the potential energy during one period of vibration in the system. This measure is especially effective in case of self-excited systems. In the case of self-excited systems, the excitation can be approximated by a negative damping coefficient and both the equivalent damping and the negative damping can be directly compared. The damping force that is provided by the damper is nonlinear and strongly amplitude dependent.

As shown in FIG. 20, the damping is zero in the sticking phase (left end of plot of FIG. 20) where the relative movement between the interacting bodies is zero. If, as described above, the limit between the sticking and slipping phase is exceeded by the force that is transferred through the contact interface, a relative sliding motion is occurring that causes the energy dissipation. The damping ratio provided by the friction damping is then increasing to a maximum and afterwards declining to a minimum. The amplitude that will be occurring is dependent upon the excitation that could be described by the negative damping term. Herein, the maximum of the damping provided, as depicted in FIG. 20, has to be higher than the negative damping from the self-excitation mechanism. The amplitude that is occurring in a so-called limit cycle can be determined by the intersection of the negative damping ratio and the equivalent damping ratio that is provided by the friction damper.

The curve is dependent on different parameters. It is beneficial to have a high normal force but a sliding phase with a minimum amplitude. In the case of the inertial mass, this can be achieved by a high mass or by placing the contact interface at a point of high acceleration with respect to the excited mode shape. In the case of contacting interfaces, a high relative displacement in comparison to the amplitude of the mode shape at the contact point, e.g., along the axial axis of the BHA, is beneficial. Therefore, an optimal placement of the damper according to a high amplitude or relative amplitude is important. This can be achieved by using simulation results, as discussed below. The normal force and the friction coefficient can be used to shift the curve to lower or higher amplitudes but does not have a high influence on the damping maximum. If more than one friction damper is implemented, this would lead to a superposition of similar curves shown in FIG. 20. If the normal force and friction coefficients are adjusted to achieve the maximum at the same amplitude, this is beneficial for the overall damping that is achieved. Further, slightly shifted damping curves would lead to a resulting curve that could be broader with respect to the amplitude that could be beneficial to account for impacts that could shift the amplitude to the right of the maximum. In this case, the amplitude would increase to a very high value in case of self-excited systems as indicated by the negative damping. In this case, the amplitude needs to be shifted again to the left side of the maximum, e.g., by going off bottom or reducing the rotary speed of the system to lower levels. The amplitude in this context approximately linearly scales by the mean rotary speed as indicated and discussed with respect to FIG. 8B, below.

Referring again to FIG. 7, the string 704, and thus the downhole system 702, rotates with a rotary speed dφ/dτ, that may be measured in revolutions per minute (RPM). The second element 712 is mounted onto the first element 710. A normal force F_(N) between the first element 710 and the second element 712 can be selected or adjusted through application and use of an adjusting element 716. The adjusting element 716 may be adjustable, for example via a thread, an actuator, a piezoelectric actuator, a hydraulic actuator, and/or a spring element, to apply force that has a component in the direction perpendicular to the contact surface 714 between the first element 710 and the second element 712. For example, as shown in FIG. 7, the adjusting element 716 may apply a force in axial direction of downhole system 702, that translates into a force component F_(N) that is perpendicular to the contact surface 714 of first element 710 and second element 712 due to the non-zero angle between the axis of the downhole system 702 and the contact surface 714 of first element 710 and second element 712. In some configurations, an angle between the system 712 and the inertial mass element is selected or defined to allow a sliding motion and avoid self-locking.

The second element 712 has a moment of inertia J. When HFTO occurs during operation of the downhole system 702, both the downhole system 702 and the second element 712 are accelerated according to a mode shape (e.g., defines the amplitude distribution along the dimensions of the drilling system, drill string, and/or BHA) and the amplitude of the mode (e.g., scales the amplitude of the mode shape). Exemplary results of such operation are shown in FIGS. 8A and 8B. FIG. 8A is a plot of tangential (i.e., circumferential) acceleration measured at a drill bit and FIG. 8B is a corresponding rotary speed.

Due to the tangential acceleration and the inertia of the second element 712, relative inertial forces occur between the second element 712 and the first element 710. If these inertial forces exceed a threshold between sticking and slipping, i.e., if these inertial forces exceed static friction force between the first element 710 and the second element 710, a relative movement between the elements 710, 712 will occur that leads to energy dissipation. In such arrangements, the accelerations, the static and/or dynamic friction coefficient, and the normal force determine the amount of dissipated energy. For example, the moment of inertia J of the second element 712 determines the relative force that has to be transferred between the first element 710 and the second element 712. High accelerations and moments of inertia increase the tendency for slipping at the contact surface 714 and thus lead to a higher energy dissipation and equivalent damping ratio provided by the damper.

Due to the energy dissipation that is caused by frictional movement between the first element 710 and the second element 712, heat and wear will be generated on the first element 710 and/or the second element 712. To keep the wear below an acceptable level, materials can be used for the first and/or second elements 710, 712 that can withstand the wear. For example, diamonds or polycrystalline diamond compacts can be used for, at least, a portion of the first and/or second elements 710, 712. Alternatively, or in addition, coatings may help to reduce the wear due to the friction between the first and second elements 710, 712. The heat can lead to high temperatures and may impact reliability or durability of the first element 710, the second element 712, and/or other parts of the downhole system 702. The first element 710 and/or the second element 712 may be made of a material with high thermal conductivity or high heat capacity and/or may be in contact with a material with high thermal conductivity or heat capacity.

Such materials with high thermal conductivity include, but are not limited to, metals or compounds including metal, such as copper, silver, gold, aluminum, molybdenum, tungsten or thermal grease comprising fat, grease, oil, epoxies, silicones, urethanes, and acrylates, and optionally fillers such as diamond, metal, or chemical compounds including metal (e.g., silver, aluminum in aluminum nitride, boron in boron nitride, zinc in zinc oxide), or silicon or chemical compounds including silicon (e.g., silicon carbide). In addition or alternatively, one or both of the first element 710 and the second element 712 may be in contact with a fluid, such as the drilling fluid, that is configured to remove heat from the first element 710 and/or the second element 712 in order to cool the respective element 710, 712. Further, an amplitude limiting element (not shown), such as a key, a recess, or a spring element may be employed and configured to limit the energy dissipation to an acceptable limit that reduces the wear.

When arranging the damping system 700, a high normal force and/or static or dynamic friction coefficient will prevent a relative slipping motion between the first element 710 and the second element 712, and in such situations, no energy will be dissipated. In contrast, a low normal force and/or static or dynamic friction coefficient can lead to a low friction force and slipping will occur but the dissipated energy is low. In addition, low normal force and/or static or dynamic friction coefficient may lead to the case that the friction at the outer surface of the second element 712, e.g., between the second element 712 and the formation 708, is higher than the friction between first element 710 and second element 712, thus leading to the situation that the relative velocity between first element 710 and second element 712 is not equal to or close to zero but is in the range of the mean velocity between downhole system 702 and formation 708. As such, the normal force and the static or dynamic friction coefficient and the placement of the damper element with respect to the exited mode and mode shape may be adjusted (e.g., by using the adjusting element 716) to achieve an optimized value for energy dissipation.

This can be done by adjusting the normal force F_(N), the static friction coefficient μ₀, the dynamic friction coefficient μ, the placement of the damper element with respect to the excited mode shape, or combinations thereof. The normal force F_(N) can be adjusted by positioning the adjusting element 716 and/or by actuators that generate a force on one of the first and second elements with a component perpendicular to the contact surface of first and second element, by adjusting the pressure regime around first and second element, or by increasing or decreasing an area where a pressure is acting on. For example, by increasing the outer pressure that acts on the second element, such as the mud pressure, the normal force F_(N) will be increased as well. Adjusting the pressure of the mud downhole may be achieved by adjusting the mud pumps (e.g., mud pumps 34 shown in FIG. 1) on surface or other equipment on surface or downhole that influences the mud pressure, such as bypasses, valves, desurgers. The normal force can be adjusted to be harmonic with the same frequency as the natural frequency of the excited mode shape and thus have low normal force values for low acceleration of the inertial mass and high normal force values for low accelerations of the inertial mass and therefor allow sliding motion for low acceleration values.

The normal force F_(N) may also be adjusted by a biasing element (not shown), such as a spring element, that applies force on the second element 712, e.g. a force in an axial direction away from or toward the first element 710. Adjusting the normal force F_(N) may also be done in a controlled way based on an input received from a sensor. For example, a suitable sensor (not shown) may provide one or more parameter values to a controller (not shown), the parameter value(s) being related to the relative movement of the first element 710 and the second element 712 or the temperature of one or both of the first element 710 and the second element 712. Based on the parameter value(s), the controller may provide instruction to increase or decrease the normal force F_(N). For example, if the temperature of one or both of the first element 710 and the second element 712 exceeds a threshold temperature, the controller may provide instruction to decrease the normal force F_(N) to prevent damage to one or both of the first element 710 and the second element 712 due to high temperatures. Similarly, for example, if a distance, velocity, or acceleration of the second element 712 relative to the first element 710 exceeds a threshold, the controller may provide instructions to increase or decrease the normal force F_(N) to ensure optimal energy dissipation. By monitoring the parameter value, the normal force F_(N) may be controlled to achieve desired results over a time period. For instance, the normal force F_(N) may be controlled to provide optimal energy dissipation while keeping the temperature of one or both of the first element 710 and the second element 712 below a threshold for a drilling run or a portion thereof.

Additionally, the static or dynamic friction coefficient can be adjusted by utilizing different materials, for example, without limitation, material with different stiffness, different roughness, and/or different lubrication. For example, a surface with higher roughness often increases the friction coefficient. Thus, the friction coefficient can be adjusted by choosing a material with an appropriate friction coefficient for at least one of the first and the second element or a part of at least one of the first and second element. The material of first and/or second element may also have an effect on the wear of the first and second element. To keep the wear low of the first and second element it is beneficial to choose a material that can withstand the friction that is created between the first and second elements. The inertia, the friction coefficient, and the expected acceleration amplitudes (e.g., as a function of mode shape and eigenfrequency) of the second element 712 are parameters that determine the dissipated energy and also need to be optimized. The critical mode shapes and acceleration amplitudes can be determined from measurements or calculations or based on other known methods as will be appreciated by those of skill in the art. Examples are a finite element analysis or the transfer matrix method or finite differences method and based on this a modal analysis or analytical models. The placement of the friction damper is optimal where a high relative displacement or acceleration is expected.

Turning now to FIGS. 9A and 9B, an example of a downhole system 900 and corresponding modes are shown. FIG. 9A is a schematic plot of a downhole system illustrating a shape of a downhole system as a function of distance-from-bit, and FIG. 9B illustrates example corresponding mode shapes of torsional oscillations that may be excited during operation of the downhole system of FIG. 9A. The illustrations of FIGS. 9A and 9B demonstrate the potential location and placement of one or more elements of a damping system onto the downhole system 900.

As illustratively shown in FIG. 9A, the downhole system 900 has various components with different diameters (along with differing masses, densities, configurations, etc.) and thus during rotation of the downhole system 900, different components may cause various modes to be generated. The illustrative modes indicate where the highest amplitudes will exist that may require damping by application of a damping system. For example, as shown in FIG. 9B, the mode shape 902 of a first torsional oscillation, the mode shape 904 of a second torsional oscillation, and the mode shape 906 of a third torsional oscillation of the downhole system 900 are shown. Based on the knowledge of mode shapes 902, 904, 906, the position of the first elements of damping system can be optimized. Where an amplitude of a mode shape 902, 904, 906 is maximum (peaks), damping may be required and/or achieved. Accordingly, illustratively shown are two potential locations for attachment or installation of a damping system of the present disclosure.

For example, a first damping location 908 is close to the drill bit of downhole system 900 and mainly damps the first and third torsional oscillations (corresponding to mode shapes 902, 906) and provides some damping with respect to the second torsional oscillation (corresponding to mode shape 904). That is, the first damping location 908 to be approximately at a peak of the third torsional oscillation (corresponding to mode shape 906), close to peak of the first torsional oscillation mode shape 902, and about half-way to peak with respect to the second torsional oscillation mode shape 904.

A second damping location 910 is arranged to again mainly provide damping of the third torsional oscillation mode shape 906 and provide some damping with respect to the first torsional oscillation mode shape 902. However, in the second damping location 910, no damping of the second torsional oscillation mode shape 904 will occur because the second torsional oscillation mode shape 904 is nearly zero at the second damping location 910.

Although only two locations are shown in FIGS. 9A and 9B for placement of damping systems of the present disclosure, embodiments are not to be so limited. For example, any number and any placement of damping systems may be installed along a downhole system to provide torsional vibration damping upon the downhole system. An example of a preferred installation location for a damper is where one or more of the expected mode shapes show high amplitudes.

Due to the high amplitudes at the drill bit, for example, one good location of a damper is close to or even within the drill bit. Further, the first and second elements are not limited to a single body but can take any number of various configurations to achieve desired damping. That is, multiple body (multi-body) first or second elements (e.g., friction damper) with each body having the same or different normal forces, friction coefficients, and moments of inertia can be employed. Such multiple-body element arrangements can be used, for example, if it is uncertain which mode shape and corresponding acceleration is expected at a given position along a downhole system.

For example, two or more element bodies that can achieve different relative slipping motion between each other to dissipate energy may be used. The multiple bodies of the first element can be selected and assembled with different static or dynamic friction coefficients, angles between the contact surfaces, and/or may have other mechanisms to influence the amount of friction and/or the transition between sticking and slipping. Several amplitude levels, excited mode shapes, and/or natural frequencies can be damped with such configurations.

For example, turning to FIG. 10, a schematic illustration of a damping system 1000 in accordance with an embodiment of the present disclosure is shown. The damping system 1000 can operate similar to that shown and described above with respect to FIG. 7. The damping system 1000 includes first element 1010 and second elements 1012. However, in this embodiment, the second element 1012 that is mounted to the first element 1010 of a downhole system 1002 is formed from a first body 1018 and a second body 1020. The first body 1018 has a first contact surface 1022 between the first body 1018 and the first element 1010 and the second body 1020 has a second contact surface 1024 between the second body 1020 and the first element 1010. As shown, the first body 1018 is separated from the second body 1020 by a gap 1026. The gap 1026 is provided to prevent interaction between the first body 1018 and the second body 1020 such that they can operate (e.g., move) independent of each other or do not directly interact with each other. In this embodiment, the first body 1018 has a first static or dynamic friction coefficient pi and a first force F_(N1) that is normal to the first contact surface 1022, whereas the second body 1020 has a second static or dynamic friction coefficient μ₂ and a second force F_(N2) that is normal to the second contact surface 1024. Further, the first body 1018 can have a first moment of inertia J₁ and the second body 1020 can have a second moment of inertia J₂. In some embodiments, at least one of the first static or dynamic friction coefficient μ₁, the first normal force F_(N1), and the first moment of inertia J₁ are selected to be different than the second static or dynamic friction coefficient μ₂, the second normal force F_(N2), and the second moment of inertia J₁, respectively. Thus, the damping system 1000 can be configured to account for multiple different mode shapes at a substantially single location along the downhole system 1002.

Turning now to FIG. 11, a schematic illustration of a damping system 1100 in accordance with an embodiment of the present disclosure is shown. The damping system 1100 can operate similar to that shown and described above. However, in this embodiment, a second element 1112 that is mounted to a first element 1110 of a downhole system 1102 is formed from a first body 1118, a second body 1120, and a third body 1128. The first body 1118 has a first contact surface 1122 between the first body 1118 and the first element 1110, the second body 1120 has a second contact surface 1124 between the second body 1120 and the first element 1110, and the third body 1128 has a third contact surface 1130 between the third body 1128 and the first element 1110. As shown, the third body 1128 is located between the first body 1118 and the second body 1020. In this embodiment, the three bodies 1118, 1120, 1128 are in contact with each other and thus can have normal forces and static or dynamic friction coefficients therebetween.

The contact between the three bodies 1118, 1120, 1128 may be established, maintained, or supported by elastic connection elements such as spring elements between two or more of the bodies 1118, 1120, 1128. In addition, or alternatively, the first body 1118 may have a first static or dynamic friction coefficient μ₁ and a first force F_(N1) at the first contact surface 1122, the second body 1120 may have a second static or dynamic friction coefficient μ₂ and a second force F_(N2) at the second contact surface 1124, and the third body 1128 may have a third static or dynamic friction coefficient μ₃ and a third force F_(N3) at the third contact surface 1130.

In addition, or alternatively, the first body 1118 and the third body 1128 may have a fourth force F_(N13) and a fourth static or dynamic friction coefficient μ₁₃ between each other at a contact surface between the first body 1118 and the third body 1128. Similarly, the third body 1128 and the second body 1120 may have a fifth force F_(N32) and a fifth static or dynamic friction coefficient μ₃₂ between each other at a contact surface between the third body 1128 and the second body 1120.

Further, the first body 1118 can have a first moment of inertia J₁, the second body 1120 can have a second moment of inertia J₂, and the third body 1128 can have a third moment of inertia J₃. In some embodiments, the static or dynamic friction coefficients μ₁, μ₂, μ₃, μ₁₃, μ₃₂, the forces F_(N1), F_(N2), F_(N3), F₁₃, F₃₂, and the moment of inertia J₁, J₂, J₃ can be selected to be different than each other so that the product μ_(i)·F_(i) (with i=1, 2, 3, 13, 32) are different for at least a subrange of the relative velocities of first element 1110, first body 1118, second body 1120, and third body 1128. Moreover, the static or dynamic friction coefficients and normal forces between adjacent bodies can be selected to achieve different damping effects.

Although shown and described with respect to a limited number of embodiments and specific shapes, relative sizes, and numbers of elements, those of skill in the art will appreciate that the damping systems of the present disclosure can take any configuration. For example, the shapes, sizes, geometries, radial placements, contact surfaces, number of bodies, etc. can be selected to achieve a desired damping effect. While in the arrangement that is shown in FIG. 11, the first body 1118 and the second body 1120 are coupled to each other by the frictional contact to the third body 1128, such arrangement and description is not to be limiting. The coupling between the first body 1118 and the second body 1120 may also be created by a hydraulic, electric, or mechanical coupling means or mechanism. For example, a mechanical coupling means between the first body 1118 and the second body 1120 may be created by a rigid or elastic connection of first body 1118 and the second body 1120.

Turning now to FIG. 12, a schematic illustration of a damping system 1200 in accordance with an embodiment of the present disclosure is shown. The damping system 1200 can operate similar to that shown and described above. However, in this embodiment, a second element 1212 of the damping system 1200 is partially fixedly attached to or connected to a first element 1210. For example, as shown in this embodiment, the second element 1212 has a fixed portion 1232 (or end) and a movable portion 1234 (or end). The fixed portion 1232 is fixed to the first element 1210 along a fixed connection 1236 and the movable portion 1234 is in frictional contact with the first element 1210 across the contact surface 1214 (similar to the first element 1010 in frictional contact with the second element 1012 described with respect to FIG. 10).

The movable portion 1234 can have any desired length that may be related to the mode shapes as shown in FIG. 9B. For example, in some embodiments, the movable portion may be longer than a tenth of the distance between the maximum and the minimum of any of the mode shapes that may have been calculated for a particular drilling assembly. In another example, in some embodiments, the movable portion may be longer than a quarter of the distance between the maximum and the minimum of any of the mode shapes that may have been calculated for a particular drilling assembly. In another example, in some embodiments, the movable portion may be longer than a half of the distance between the maximum and the minimum of any of the mode shapes that may have been calculated for a particular drilling assembly. In another example, in some embodiments, the movable portion may be longer than the distance between the maximum and the minimum of any of the mode shapes that may have been calculated for a particular drilling assembly.

As such, even though it may not be known where the exact location of mode maxima or minima is during a downhole deployment, it is assured that the second element 1212 is in frictional contact with the first element 1210 at a position of maximum amplitude to achieve optimized damping. Although shown with a specific arrangement, those of skill in the art will appreciate that other arrangements of partially fixed first elements are possible without departing from the scope of the present disclosure. For example, in one non-limiting embodiment, the fixed portion can be in a more central part of the first element such that the first element has two movable portions (e.g., at opposite ends of the first element). As can be seen in FIG. 12, the movable portion 1234 of the second element 1212 is rather elongated and may cover a portion of the mode shapes (such as mode shapes 902, 904, 906 in FIG. 9B) that correspond to the length of the movable portion 1234 of the second element 1212. An elongated second element 1212 in frictional contact with the first element 1210 may have advantages compared to shorter second elements because shorter second elements may be located in an undesired portion of the mode shapes such as in a damping location 910 where the second mode shape 904 is small or even zero as explained above with respect to FIG. 9B. Utilizing an elongated second element 1212 may ensure that at least a portion of the second element is at a distance from locations where one or more of the mode shapes are zero or at least close to zero. FIGS. 13-19 and 21-22 show more varieties of elongated second elements in frictional contact with first elements. In some embodiments, the elongated second elements may be elastic so that the movable portion 1234 is able move relative to the first element 1210 while the fixed portion 1232 is stationary relative to first element 1210. In some embodiments, the second element 1212 may have multiple contact points at multiple locations of the first element 1210.

In the above described embodiments, and in damping systems in accordance with the present disclosure, the first elements are temporarily fixed to the second elements due to a friction contact. However, as vibrations of the downhole systems increase, and exceed a threshold, e.g., when a force of inertia exceeds the static friction force, the first elements (or portions thereof) move relative to the second elements, thus providing the damping. That is, when HFTO increase above predetermined thresholds (e.g., thresholds of amplitude, distance, velocity, and/or acceleration) within the downhole systems, the damping systems will automatically operate, and thus embodiments provided herein include passive damping systems. For example, embodiments include passive damping systems automatically operating without utilizing additional energy and therefore do not utilize an additional energy source.

Turning now to FIG. 13, a schematic illustration of a damping system 1300 in accordance with an embodiment of the present disclosure is shown. In this embodiment, the damping system 1300 includes one or more elongated first elements 1310 a, 1310 b, 1310 c, 1310 d, 1310 e, 1310 f, each of which is arranged within and in contact with a second element 1312. Each of the first elements 1310 a, 1310 b, 1310 c, 1310 d, 1310 e, 1310 f may have a length in an axial tool direction (e.g., in a direction perpendicular to the cross-section that is shown in FIG. 13) and optionally a fixed point where the respective first elements 1310 a, 1310 b, 1310 c, 1310 d, 1310 e, 1310 f are fixed to the second element 1312. For example, the first elements 1310 a, 1310 b, 1310 c, 1310 d, 1310 e, 1310 f can be fixed at respective upper ends, middle portions, lower ends, or multiple points of fixation for the different first elements 1310 a, 1310 b, 1310 c, 1310 d, 1310 e, 1310 f, or multiple points for a given single first element 1310 a, 1310 b, 1310 c, 1310 d, 1310 e, 1310 f. Further, as shown in FIG. 13, the first elements 1310 a, 1310 b, 1310 c, 1310 d, 1310 e, 1310 f can be optionally biased or engaged to the second element 1312 by a biasing element 1338 (e.g., by a biasing spring element or a biasing actuator applying a force with a component toward the second element 1312). Each of the first elements 1310 a, 1310 b, 1310 c, 1310 d, 1310 e, 1310 f can be arranged and selected to have the same or different normal forces, static or dynamic friction coefficients, and moments of inertia, thus enabling various damping configurations.

In some embodiments, the first elements may be substantially uniform in material, shape, and/or geometry along a length thereof. In other embodiments, the first elements may vary in shape and geometry along a length thereof. For example, with reference to FIG. 14, a schematic illustration of a damping system 1400 in accordance with an embodiment of the present disclosure is shown. In this embodiment, a first element 1410 is arranged relative to a second element 1412, and the first element 1410 has a tapering and/or spiral arrangement relative to the second element 1412. Accordingly, in some embodiments, a portion of the first or second element can change geometry or shape along a length thereof, relative to the second element, and such changes can also occur in a circumferential span about or relative to the second element and/or with respect to a tool body or downhole system.

Turning now to FIG. 15, a schematic illustration of another damping system 1500 in accordance with an embodiment of the present disclosure is shown. In the damping system 1500, a first element 1510 is a toothed (threaded) body that is fit within a threaded second element 1512. The contact between the teeth (threads) of the first element 1510 and the threads of the second element 1512 can provide the frictional contact between the two elements 1510, 1512 to enable damping as described herein. Due to the slanted surfaces of the first element 1510, the first element 1510 will start to move under both axial and/or torsional vibrations. Further, movement of first element 1510 in an axial or circumferential direction will also create movement in the circumferential or axial direction, respectively, in this configuration. Therefore, with the arrangement shown in FIG. 15, axial vibrations can be utilized to mitigate or damp torsional vibrations as well as torsional vibrations can be utilized to mitigate or damp axial vibrations.

The locations where the axial and torsional vibrations occur may be different. For example, while the axial vibrations may be homogeneously distributed along the drilling assembly, the torsional vibrations may follow a mode shape pattern as discussed above with respect FIGS. 9A-9B. Thus, irrespective of where the vibrations occur, the configuration shown in FIG. 15 may be utilized to damp torsional vibrations with the movement of the first element 1510 relative to the second element 1512 caused by the axial vibrations and vice versa. As shown, an optional tightening element 1540 (e.g., a bolt) can be used to adjust the contact pressure or normal force between the two elements 1510, 1512, and thus adjust the frictional force and/or other damping characteristics of the damping system 1500.

Turning now to FIG. 16, a schematic illustration of a damping system 1600 in accordance with another embodiment of the present disclosure is shown. The damping system 1600 that includes a first element 1610 that is a stiff rod that is at one end fixed within a second element 1612. In this embodiment, a rod end 1610 a is arranged to frictionally contact a second element stop 1612 a to thus provide damping as described in accordance with embodiments of the present disclosure. The normal force between the rod end 1610 a and the second element stop 1612 a may be adjustable, for example, by a threaded connection between the rod end 1610 a and the first element 1610. Further, the stiffness of the rod could be selected to optimize the damping or influence the mode shape in a beneficial way to provide a larger relative displacement. For example, selecting a rod with a lower stiffness would lead to higher amplitudes of the torsional oscillations of the first element 1610 and a higher energy dissipation.

Turning now to FIG. 17, a schematic illustration of a damping system 1700 in accordance with another embodiment of the present disclosure is shown. The damping system 1700 that includes a first element 1710 that is frictionally attached or connected to a second element 1712 that is arranged as a stiff rod and that is fixedly connected (e.g., by welding, screwing, brazing, adhesion, etc.) to an outer tubular 1714, such as a drill collar, at a fixed connection 1716. In one aspect, the rod may be a tubular that includes electronic components, power supplies, storage media, batteries, microcontrollers, actuators, sensors, etc. that are prone to wear due to HFTO. That is, in one aspect, the second element 1712 may be a probe, such as a probe to measure directional information, including one or more of a gravimeter, a gyroscope, and a magnetometer. In this embodiment, the first element 1710 is arranged to frictionally contact, move, or oscillate relative to and along the fixed rod structure of the second element 1712 to thus provide damping as described in accordance with embodiments of the present disclosure. While the first element 1710 is shown in FIG. 17 to be relatively small compared to the damping system 1700, it is not meant to be limited in that respect. Thus, the first element can 1710 can be of any size and can have the same outer diameter as the damping system 1700. Further, the location of the first element 1710 may be adjustable in order to move the first element 1710 closer to a mode shape maximum to optimize damping mitigation.

Turning now to FIG. 18, a schematic illustration of a damping system 1800 in accordance with another embodiment of the present disclosure is shown. The damping system 1800 that includes a first element 1810 that is frictionally movable along a second element 1812. In this embodiment, the first element 1810 is arranged with an elastic spring element 1842, such as a helical spring or other element or means, to engage the first element 1810 with the second element 1812, and to thus provide a restoring force when the first element 1810 has moved and is deflected relative to the second element. The restoring force is directed to reduce the deflection of the first element 1810 relative to the second element 1812. In such embodiments, the elastic spring element 1842 can be arranged or tuned to resonance and/or to a critical frequency (e.g., lowest critical frequency) of the elastic spring element 1842 or the oscillation system comprising the first element 1810 and the elastic spring element 1842.

Turning now to FIG. 19, a schematic illustration of a damping system 1900 in accordance with another embodiment of the present disclosure is shown. The damping system 1900 that includes a first element 1910 that is frictionally movable about a second element 1912. In this embodiment, the first element 1910 is arranged with a first end 1910 a having a first contact (e.g., first end normal force F_(Ni), first end static or dynamic friction coefficient μ_(i), and first end moment of inertia J₁) and a second contact at a second end 1910 b (e.g., second end normal force F_(Ni), second end static or dynamic friction coefficient μ_(i), and second end moment of inertia J_(i)). In some such embodiments, the type of interaction between the respective first end 1910 a or second end 1910 b and the second element 1912 may have different physical characteristics. For example, one or both of the first end 1910 a and the second end 1910 b may have a sticking contact/engagement and one or both may have a sliding contact/engagement. The arrangements/configurations of the first and second ends 1910 a, 1910 b can be set to provide damping as described in accordance with embodiments of the present disclosure.

Advantageously, embodiments provided herein are directed to systems for mitigating high-frequency torsional oscillations (HFTO) of downhole systems by application of damping systems that are installed on a rotating string (e.g., drill string). The first elements of the damping systems are, at least partially, frictionally connected to move circumferentially relative to an axis of the string (e.g., frictionally connected to rotate about the axis of the string). In some embodiments, the second elements can be part of a drilling system or bottomhole assembly and does not need to be a separately installed component or weight. The second element, or a part thereof, is connected to the downhole system in a manner that relative movement between the first element and the second element has a relative velocity of zero or close to zero (i.e., no or slow relative movement) if no HFTO exists. However, when HFTO occurs above a distinct acceleration value, the relative movement between the first element and the second element is possible and alternating plus and minus relative velocities are achieved. In some embodiments, the second element can be a mass or weight that is connected to the downhole system. In other embodiments, the second element can be part of the downhole system (e.g., part of a drilling system or BHA) with friction between the first element and the second element, such as the rest of the downhole system providing the functionality described herein.

As described above, the second elements of the damping systems are selected or configured such that when there is no vibration (i.e., HFTO) in the string, the second element will be frictionally connected to the first element by the static friction force. However, when there is vibration (HFTO), the second elements become moving with respect to the first element and the frictional contact between the first and the second element is reduced as described above with respect to FIG. 2, such that the second element can rotate (move) relative to the first element (or vice versa). When moving, the first and second elements enable energy dissipation, thus mitigating HFTO. The damping systems, and particularly the first elements thereof, are positioned, weighted, forced, and sized to enable damping at one or more specific or predefined vibration modes/frequencies. As described herein, the first elements are fixedly connected when no HFTO vibration is present but are then able to move when certain accelerations (e.g., according to HFTO modes) are present, thus enabling damping of HFTO through a zero crossing of a relative velocity (e.g., switching between positive and negative relative rotational velocities).

In the various configurations discussed above, sensors can be used to estimate and/or monitor the efficiency and the dissipated energy of a damper. The measurement of displacement, velocity, and/or acceleration near the contact point or surface of the two interacting bodies, for example in combination with force or torque sensors, can be used to estimate the relative movement and calculate the dissipated energy. The force may also be known without a measurement, for example, when the two interacting bodies are engaged by a biasing element, such as a spring element or an actuator. The dissipated energy could also be derived from temperature measurements. Such measurement values may be transmitted to a controller or human operator which may enable adjustment of parameters such as the normal force and/or the static or dynamic friction coefficient(s) to achieve a higher dissipated energy. For example, measured and/or calculated values of displacement, velocity, acceleration, force, and/or temperature may be sent to a controller, such as a micro controller, that has a set of instructions stored to a storage medium, based on which it adjusts and/or controls at least one of the force that engages the two interacting bodies, and/or the static or dynamic friction coefficients. Preferably, the adjusting and/or the controlling is done while the drilling process is ongoing to achieve optimum HFTO damping results.

While embodiments described herein have been described with reference to specific figures, it will be understood that various changes may be made, and equivalents may be substituted for elements thereof without departing from the scope of the present disclosure. In addition, many modifications will be appreciated to adapt a particular instrument, situation, or material to the teachings of the present disclosure without departing from the scope thereof. Therefore, it is intended that the disclosure is not limited to the particular embodiments disclosed, but that the present disclosure will include all embodiments falling within the scope of the appended claims or the following description of possible embodiments.

Severe vibrations in drillstrings and bottomhole assemblies can be caused by cutting forces at the drill bit or mass imbalances in downhole tools such as drilling motors. Negative effects are among others reduced rate of penetration, reduced quality of measurements and downhole failures.

Different sorts of torsional vibrations exist. In the literature the torsional vibrations are mainly differentiated into stick/slip of the whole drilling system and high-frequency torsional oscillations (HFTO). Both are mainly excited by self-excitation mechanisms that occur due to the interaction of the drill bit and the formation. The main differentiator between stick/slip and HFTO is the frequency and the typical mode shape: In case of HFTO the frequency is above 50 Hz compared to below 1 Hz in case of stick/slip. Further the excited mode shape of stick/slip is the first mode shape of the whole drilling system whereas the mode shape of HFTOs are commonly localized to a small portion of the drilling system and have comparably high amplitudes at the drill bit.

Due to the high frequency HFTO corresponds to high acceleration and torque values along the BHA and can have damaging effects on electronics and mechanical parts. Based on the theory of self-excitation increased damping can mitigate HFTOs if a certain limit of the damping value is reached (since self-excitation is an instability and can be interpreted as a negative damping of the associated mode).

One damping concept is based on friction. Friction between two parts in the BHA or drill string can dissipate energy and reduce the level of torsional oscillations.

In this idea a design principle is discussed that to the opinion of the inventors works best for damping with friction. The damping shall be achieved by a friction force where the operating point of the friction force with respect to the relative velocity has to be around point 204 shown in FIG. 2. This operating point leads to a high energy dissipation because a friction hysteresis is achieved whereas point 202 of FIG. 2 will lead to energy input into the system.

As discussed above, friction forces between the drilling system and the borehole will not generate significant additional damping in the system. This is because the relative velocity between the contact surfaces (e.g. a stabilizer and the borehole) does not have a zero mean value. The two interacting bodies of the friction damper must have a mean velocity or rotary speed relative to each other that is small enough so that the HFTO leads to a sign change of the relative velocity of the two interacting bodies of the friction damper. In other words, the maximum of the relative velocities between the two interacting bodies generated by the HFTO needs to be higher than the mean relative velocity between the two interacting bodies.

Energy dissipation only occurs in a slipping phase via the interface between first and second elements in the damper. Slipping occurs if the inertial force exceeds the limit between sticking and slipping that is the static friction force: F_(R)>μ₀·F_(N) (wherein the static friction force equals the static friction coefficient multiplied by the normal force between both contacting surfaces). The normal force and/or the static or dynamic friction coefficient may be adjustable to achieve an optimal or desired energy dissipation. Adjusting at least one of the normal force and the static or dynamic friction coefficient may lead to an improved energy dissipation by the damping system.

As discussed herein, the placement of the friction damper should be in the area of high HFTO accelerations, loads, and/or relative movement. Because different modes can be affected a design is preferred that is able to mitigate all HFTO modes (e.g., FIGS. 9A and 9B).

An equivalent can be used as a friction damper of the present disclosure. A collar 2100 with slots as shown in FIGS. 21 and 22 can be employed. A cross-sectional view of the collar 2100 with slots is shown in FIG. 22. In one non-limiting embodiment, the collar 2100 with slots has a high flexibility or low stiffness and will lead to higher deformations if no friction devices 2102 are entered. The higher velocity will cause higher centrifugal forces that will force the friction devices 2102 that will be pressed into the slots with optimized normal forces to allow high friction damping. In this configuration, other factors that can be optimized are the number and geometry of slots as well as the geometry of the damper. An additional normal force can be applied by spring elements, as shown in FIG. 22, actuators, and/or by centrifugal forces, as discussed above.

The advantage of this principle is that the friction devices 2102 will be directly mounted into the force flow. A twisting of the collar due to an excited HFTO mode and corresponding mode shape will partly be supported by the friction devices 2102 that will move up and down during one period of vibration. The high relative movement along with an optimized friction coefficient and normal force will lead to a high dissipation of energy.

This goal is to prevent an amplitude increase of the HFTO amplitudes (represented by tangential acceleration amplitudes in this case). The (modal) damping that has to be added to every instable torsional mode by the friction damper needs to be higher than the energy input into the system. The energy input is not happening instantaneously but over many periods until the worst case amplitude is reached (zero RPM at the drill bit).

With this concept a comparably short collar can be used because the friction damper uses the relative movement along the distance from bit. It is not necessary to have a high tangential acceleration amplitude but only some deflection (“twisting”) of the collar that will be achieved in nearly every place along the BHA. The collar and the dampers should have a similar mass to stiffness ratio (“impedance”) compared to the BHA. This would allow the mode shape to propagate in the friction collar. A high damping will be achieved that will mitigate HFTO if the parameters discussed above are adjusted (normal force due to springs etc.). The advantage in comparison to other friction damper principles is the application of the friction devices directly into the force flow of the deflection to a HFTO mode. The comparably high relative velocity between the friction devices and the collar will lead to a high dissipation of energy.

The damper will have a high benefit and will work for different applications. HFTO causes high costs due to high repair and maintenance efforts, reliability issues with non-productive time and small market share. The proposed friction damper would work below a motor (that decouples HFTO) and also above a motor. It could be mounted in every place of the BHA that would also include a placement above the BHA if the mode shape propagates to this point. The mode shape will propagate through the whole BHA if the mass and stiffness distribution is relatively similar. An optimal placement could for example be determined by a torsional oscillation advisor that allows a calculation of critical HFTO-modes and corresponding mode shapes.

Furthermore, as noted above, due to the high amplitudes at the drill bit, one location of a damper, as described herein, may be within the drill bit. That is, in accordance with some embodiments of the present disclosure, the dampers may be integrated into and part of a drill bit or other disintegration device. In such embodiments, the distance-to-bit is zero or substantially zero.

In some such embodiments, a damper may be formed of a mass or inertia that is only coupled through a damping force or damping torque to the drill bit or a string damper element. The damping force could, for example, and without limitation, be viscous damping, friction damping, hydraulic damping, magnetic damping (e.g., eddy current damping), piezoelectric (shunt) damping, etc. In some such embodiments, the damper may be combined with a spring that would enable a tuned damper, for example, a tuned friction damper. In these cases, the eigenfrequency of the damper would be tuned to the eigenfrequency of the mode that shall be damped. In addition to installation or mounting within or at a drill bit (i.e., the end of a downhole string), a damper may be installed at any location in or on a BHA, and thus be arranged proximate an end of the downhole string.

As described above, the placement of devices for vibration damping along a drill string affects the vibration damping efficiency. Typical HFTO modes, because these modes are of a higher-order, have several nodes and maxima along the BHA section of the string. Placing a vibration damper, which reacts on vibration amplitude, at a position inside or on top of the BHA, that has a low or no (node) amplitude of the mode shape, can lead to a low efficiency damping for the respective mode. However, placing the damper at a local maximum of the mode to be damped creates higher damping for this mode, as described above.

In accordance with some embodiments of the present disclosure, drill string elements, hereinafter “mode-shape tuning elements,” with predetermined or selected lengths and/or diameters may be employed to increase a local maximum amplitude at a particular location of the mode shape, such as the mass-normalized mode shape. Such amplification can increase the effectiveness of damping. That is, intentional and specific modification of drill string and/or BHA can enable control of the location and amplitude of local maxima of the mode shape, such as the mass-normalized mode shape, thereby controlling and/or improving the effectiveness of damping, which may be implemented as described above, with the inclusion of mode-shape tuning elements.

For example, through modeling or other software, mode-shape tuning elements can be selected individually to realize improved or optimal positioning of dampers for an individual BHA setup. Such modeling or software may be used to enable custom-designed properties (e.g., dimensions, such as length or diameter, material and/or mechanical properties, such as stiffness, flexibility, weight, moment of inertia, density, or modulus of elasticity (shear and bulk)) as well as position/location of mode-shape tuning elements, and/or the position/location of one or more damping elements. Furthermore, in some embodiments, the software/modeling may be configured to select from a pool (e.g., as shown, for example, in FIG. 29A) or list of specific preconfigured mode-shape tuning elements to be used in combination with one or more damping elements. The software/modeling might also be used to create and optimize the pool of mode-shape tuning elements. In addition to length and diameter customization of mode-shape tuning elements, density, shape, modulus of elasticity (shear and bulk), and/or other parameters affecting flexibility or inertia of a string and/or BHA may be pre-determined to control local maximum amplitude.

HFTO damping and especially placement of devices for improved or optimized damping of HFTO is a rather new technology. The basic theory is disclosed in Hohl et al. (2015): “Derivation and experimental validation of an analytical criterion for the identification of self-excited modes in drilling systems,” published in Journal of Sound and Vibration, 342, pp. 290-302, the contents of which are incorporated by reference in their entirety. One presentation of mode-shape tuning to minimize vibration at certain positions in a BHA and the reduction of excitability S_(c) (e.g., the smallest slope of the torque characteristic for which the system is marginally stable) is disclosed in U.S. Pat. No. 9,976,405, titled “Method to mitigate bit induced vibrations by intentionally modifying mode shapes of drill strings by mass or stiffness changes,” issued on May 22, 2018, the contents of which are incorporated by reference in their entirety. However, artificially maximizing the amplitude of a mode shape at the actual position of a damping element is not disclosed. For example, the use of mode-shape tuning elements, as provided herein, may be used to amplify or even maximize a mode shape at a specific position, and thus enable improved efficiency of HFTO damping. Examples of mode-shape tuning elements may be torsionally soft elements (e.g., flex pipes) and/or high inertia components (e.g., heavyweight sections), or combinations of both of various length used to amplify the amplitude of the mode shape at the position of a damping element (e.g., a damping element as described above and below).

Placing dampers at arbitrary positions along a drill string is one method, but such arbitrary placement may lead to inefficient damping. Such arbitrary placement may be selected based on the specific BHA or other string property/characteristic, such that the dampers are placed at locations that are viable in view of other features of the string. This inefficient damping effect is a result of most positions being at significantly lower damping than a maximum (e.g., at locations of non-maxima of the mode shape, such as the mass-normalized mode shape shown and described above). This results in the essentially-random positioning of damping elements to result in relatively low damping effectiveness.

In additional to locating a damper at an inefficient location, there are often more than one HFTO modes that are present during drilling operation. Each mode has a respective characteristic frequency and mode shape with different local maxima and minima (depending on the wavelength). If more than one HFTO mode is likely to occur (which is typically the case), it is preferred that all (or most) modes to be sufficiently damped.

FIG. 23 illustrates the mass normalized mode shapes of some example BHA HFTO modes (top plot) and normalized damping (normalized to the maximum damping value at the distance from bit=0) for the modes (bottom plot) vs. the distance from the bit. The top plot of FIG. 23 shows that for this BHA at least four modes are generated corresponding to frequencies of 162 Hz, 216 Hz, 270 Hz, and 324 Hz. Maxima and minima of the four modes are located at different positions. For example, the first maximum of the 324 Hz mode is at approximately 10 m distance from the bit while the first maximum of the 270 Hz mode is at approximately 6 m distance from the bit. As illustrated, with the exception of the drill bit (distance 0), the damping varies with the distance from the bit but is always below 25% of the maximum damping and is therefore rather small. As such, embodiments of the present disclosure are directed to optimizing placement of one or more dampers at effective positions along or preferably on top of the BHA to effectively dampen or reduce all BHA HTFO modes. For example, depending on the position of the one or more dampers with respect to the BHA (e.g., if one or more dampers are located outside of the BHA or at the top or the bottom of the BHA), advantageously, the use of a damper element or a damper element sub without electrical connection and/or a damper element or a damper element sub that is not wired from the top to the bottom of the damper element or the damper element sub may be possible.

Embodiments of the present disclosure are directed to the placement of dampers and the tuning of mode shapes to obtain acceptable damping for all modes which are likely to occur during drilling with a specific BHA setup. In order to capture all potential mode shapes, damper elements are not necessarily placed at the maximum position of each mode, but at positions showing acceptable amplitudes of the mode shape to create sufficient damping. As such, a compromise across all modes and positioning together with selection of applicable mode-shape tuning elements (e.g., flex and heavyweight sections) to amplify and concentrate local maxima to certain positions is defined. Under the assumption of the susceptibility or severity of certain modes, a weighting of certain modes can be conducted to optimize damping of selected or target modes.

Turning to FIGS. 24A-24C, schematic plots illustrating the placement of a damper on a drill string and/or BHA are shown. FIGS. 24A-24C represent the placement of a single damper for a single HFTO mode. However, it will be appreciated that the described process may be employed for any number of damper elements and modes. In FIG. 24A, a random placement of the damper is employed, and this random placement only achieves a damping D of about 20% of the maximum possible damping of a damper at an optimal position in a non-optimized BHA (e.g., a BHA that is not optimized with respect to dimensions, such as length or diameter, material and/or mechanical properties, such as stiffness, flexibility, weight, moment of inertia, density, or modulus of elasticity (shear and bulk) as well as position/location). Although the mass-normalized deflection of the mode is only slightly smaller than 50% compared to optimal positioning, the resulting damping is significantly smaller due to the quadratic influence of the positioning (mass-normalized mode shape φ_((i,j)) for mode i and position j on the damping effect (D is proportional to φ_((i,j)) ²). Such relationship is described in the above incorporated U.S. Pat. No. 9,976,405.

One method for enabling optimization for the placement of a damper is to change the length of various drill string elements near the damper. For example, by lengthening a tube, the damper can be moved toward a maximum of a mode shape (shown in FIG. 24B), leading to an increase of the damping effect (i.e., optimum position within the initial BHA). The length of elements may be increased by the inclusion of one or more mode-shape tuning elements in a string and/or replacing a conventional string element with a mode-shape tuning element. The resulting damping can reach efficiency of up to 100% (i.e., complete damping of a given HFTO mode due to placement of a damper and mode-shape tuning/shifting due to the mode-shape tuning elements).

In addition to length alterations, one or more mode-shape tuning elements may be used to change the moment of inertia of the string. This enable local increases in the amplitude of the mode shape(s) by combining soft and high inertia drill string components. FIG. 24C illustrates the position of a damper within a BHA when two components have been changed in length and diameter (i.e., replaced by mode-shape tuning elements), compared to the maximum damping without the mode-shape tuning elements includes, the position of the damper results in 140% of the maximal damping of a BHA that is not optimized with respect to dimensions, such as length or diameter, material and/or mechanical properties, such as stiffness, flexibility, weight, moment of inertia, density, or modulus of elasticity (shear and bulk) as well as position/location. That is, using mode-shape tuning elements of specific element length and diameter for position optimization relative to a given mode maximum, more than 100% maximum damping is possible.

The mode-shape tuning elements of the present disclosure enable local changes in the properties of drill string and/or the BHA. The mode-shape tuning elements can be used as additional elements to a string or may be used as replacements of a typical string or BHA component. The mode-shape tuning elements allow for selection of diameter, length, density, modulus of elasticity, material, geometry, cross-sectional geometry, etc., to tune or shift a mode shape, and thus enable the use of dampers in specific locations to result in maximum damping effectiveness. The use of mode-shape tuning elements may result in changes of the mode shapes (e.g., the amplitude) of one, several (e.g., for the critical modes), or all modes locally at the position of the damper as well as the whole mode (e.g., at the drill bit). Further, the use of mode-shape tuning elements may change the frequency of the one, several, or all modes (e.g., modes can become critical or uncritical). Moreover, mode-shape tuning elements can change the excitability of one, several, or all modes (e.g., modes can become critical or uncritical). For example, the combination of torsionally soft mode-shape tuning elements (e.g., flex pipes) in combination with high inertia components (e.g., heavyweight sections) of various length, can amplify the amplitude of the mode shape at the position of the damping element.

For this reason, optimization methods of the present disclosure can be used to determine the damping achieved by one or numerous dampers with respect various modes. By changing local components (e.g., replacing components with one or more mode-shape tuning elements), not only the damping effect is influenced by the placement, but also the excitability of the critical modes may be affected as well.

Optimization methods that may be employed in accordance with embodiments of the present disclosure may include analyzing/calculating/simulating (e.g., numerically simulating) one or more HFTO modes of a BHA or a drilling system to determine maxima of mode shapes or damping efficiency. In a second step, a damper and/or a mode-shape tuning element with a given characteristic may be selected. Such characteristics may include, without limitation, dimensions, such as length or diameter, material and/or mechanical properties, such as stiffness, flexibility, weight, moment of inertia, density, or modulus of elasticity (shear and bulk). A position will be selected where the damper and/or a mode-shape tuning element will be added to the BHA to generate a modified BHA. In a next step, the modified BHA will be analyzed/calculated/simulated (e.g., numerically simulated) to estimate one or more HFTO modes of the modified BHA to determine modified maxima of mode shapes or modified damping efficiency. If the modified BHA meets a criterion (e.g., a preselected criterion, such as a threshold value that is related to a maximum mode shape, an excitability, a mode shape derivative, a damping efficiency, or a difference of two mode shape amplitudes), the modified BHA may be used to drill a borehole section into the formation. Otherwise, the modified BHA may be further modified by adding/removing/moving damper(s) and/or a mode-shape tuning element with a given characteristic until the criterion is met. Thus, a beneficial placement and selection of dampers and mode-shape tuning elements may be determined by an iterative process.

In an additional or alternative embodiment, the beneficial placement and selection of dampers and mode-shape tuning elements may be determined by a (numerical) inversion method. Such inversion method may include, for example, an automatic or semi-automatic inversion method. Further, in an additional or alternative embodiment, the beneficial placement and selection of dampers and mode-shape tuning elements may be determined by optimization methods that may include, without limitation, gradient-based optimization. Such gradient-based optimization may include Nelder Mead. Other possible optimization methods are Monte Carlo simulations, Levenberg-Marquard optimization, genetic algorithm, simulated annealing, least-squares-algorithm, ant-colony-optimization algorithm, conjugate gradient method, Krylov-subspace-method, biconjugate gradient method, or any other optimization method as will be appreciated by those of skill in the art. The optimization criteria or penalty function is primarily set up to maximize damping, but a constrained optimization of geometric factors or a set of predefined mode-shape tuning elements or other constraints can be used. Advantageously, one, several, or all modes may be weighted by a weighting factor or weighting function during the optimization, for example, to determine the optimization criteria or penalty function. It will be appreciated that both the mode-shape tuning and the location and effect of damping elements may be considered for a designed application/configuration.

Turning now to FIG. 25, an illustration of mode shapes as well as the normalized minimum damping of four (4) modes is shown. In the configuration used to illustrate FIG. 25, one or more mode-shape tuning elements are used in the BHA to shift or change the location of the maxima (e.g., as compared to that shown in FIG. 23). As shown in FIG. 25, at about a distance of 7.5 m from the drill bit, a minimal normalized damping of more than 60% can be determined for all modes. Therefore, this position is very suitable for a damper to stabilize all modes. That is, by using mode-shape tuning elements, the position of maxima of multiple different modes may be substantially aligned, allowing for a damper (or a few dampers) to reduce HFTO of a string.

Furthermore, still referring to FIG. 25, if not one but two dampers are to be installed in the drill string, the position at 18 m from the drill bit can also be considered as a good position because of the alignment of the different maxima. However, the minimum normalized damping at the new position (18 m) may be small compared to the damping at the 7.5 m position, the combination of both positions may offer improved damping as compared to a single-damping system. Two modes (the one at 218 Hz and at 263 Hz) have high deflections of the mode shapes at 7.5 m and two modes (160 Hz and 317 Hz) have high deflections of the mode shapes at 18 m. As a result, placement of damper elements at 7.5 m and 18 m from the drill bit may result in all modes being damped.

To enable the mode-shape tuning, one or more structural elements may be added to a drill string or BHA or may be used to replace a typical/conventional part with a modified part that is a mode-shape tuning element. That is, by including one or more mode-shape tuning elements, a tool string (i.e., drilling string plus BHA) may be customized such that one or more maxima associated with HFTO may be shifted in location, and multiple different maxima may be shifted to a single location or proximate a single location, such that a single damper element may be used to damp HTFO of different modes or orders. The mode-shape tuning elements may include, for example, an iron pipe section of a selected or predetermined length, diameter, and/or geometry, that is attached to the drill string proximate the BHA. This mode-shape tuning element may add additional weight and/or flexibility (or inflexibility) to the drill string at the location it is connected, thus altering (and shifting) the maxima of HTFO of the system. Based on this shift, a damper element may be installed to damp one or more selected HFTO modes.

Advantageously, mode-shape tuning elements added to a section of the drill string, outside, at, in, or on the BHA, may be used to shift the location of HFTO maxima and enable one or more damper elements to provide improved damping efficiency. The position of the mode-shape tuning elements with respect to the BHA may advantageously allow the use of mode-shape tuning elements without electrical connection and/or mode-shape tuning elements that are not wired from the top to the bottom of the mode-shape tuning element. The performance of actual damper elements can drastically be increased through the inclusion of mode-shape tuning elements, which in turn can lead to fewer damper elements required. Further, such optimization or improved efficiency can lead to the use of smaller and/or cheaper damper elements and better damping across various modes.

It will be appreciated that embodiments of the present disclosure are not only directed to improving the position of a damper with respect to a specific mode shape. That is, embodiments of the present disclosure are directed to changing properties of drill string elements and/or composition within or proximate the BHA. Such modifications improve the performance of installed dampers according to positioning and modification of the mode shape (i.e., mode-shape tuning, adjustment, and/or shifting). By changing one or more characteristics or properties (e.g., length, diameter, density, geometry, etc.) of a string, improved damping (e.g., more than 100%) can be achieved for one or more HFTO modes.

Turning to FIGS. 26A-26B, illustrations of a downhole string 2600 having two dampers are shown. FIG. 26A is a schematic structural illustration of the downhole string 2600 and FIG. 26B illustrates the modified or tuned mode shapes by incorporating mode-shape tuning elements 2602. As shown, in this embodiment, two damper elements 2604 are shown, located at shifted maxima such that multiple HFTO modes may be damped by the damper elements 2604. In this illustration the downhole string 2600 represents a sample BHA having damper elements 2604 installed thereon. BHAs are subject to critical vibration environments, and thus damping of such vibrations is advantageous. For all BHA configurations only few mode-shape tuning elements 2602 (e.g., flex and heavyweight pipe segments) are required for maximum damping impact placement of the damper elements 2604.

In accordance with some embodiments of the present disclosure, it may be possible to permanently achieve a specific response for all HFTO modes at a position by using certain components (e.g., mode-shape tuning elements, specific damper elements, isolator elements, etc.). For example, isolator elements are shown and described in commonly owned U.S. Patent Application Publication No. 2019/0284882A1, entitled “Dampers for mitigation of downhole tool vibrations and vibration isolation device for downhole bottom hole assembly,” U.S. Provisional Patent Application 62/899,331, entitled “Vibration Isolating Coupler for Reducing High Frequency Torsional Vibrations in a Drill String,” and U.S. Provisional Patent Application 62/899,332, entitled “Vibration Isolating Coupler for Attenuating Vibrations in a Drill String,” which are incorporated herein by reference in their entireties. Moreover, it will be appreciated that such mode-shape shifting and tuning is not limited to friction dampers. For example, stiffness-based damping principles may be employed in accordance with some embodiments of the present disclosure. The optimal position of stiffness-based damping principles does not depend on the amplitude of the mode shape, but on the derivative thereof. As such, the difference between two amplitudes of the mode shape (mode shape difference) may be considered for stiffness-based damping. An optimum for a damping principle based on stiffness are nodes, since the relative displacement is greatest there.

As noted above, in addition to adding length and/or weight in the form of mode-shape tuning elements, the mode-shape tuning elements of the present disclosure may provide other modifications to a string and/or BHA such that a mode shape is shifted or tuned to a specific location, thus enabling improved efficiency of damper elements installed on or in the string and/or BHA. For example, lengthening pipe segments may be used to increase flexibility of a string, modified shapes or geometry (other than just changing diameter) may be employed, altering density and/or modulus of elasticity, or other property of a string/BHA may be modified or customized to achieve a shift in HFTO mode shape. As such, a combination of mode-shape tuning elements and damper elements may be employed in a downhole system to improve the efficiency of HFTO damping and thus reduction in tool vibrations and adverse impacts associated therewith may be reduced, avoided, or eliminated.

Turning now to FIGS. 27-28, schematic illustrations of damper elements 2700, 2800 are shown. The damper elements 2700, 2800 are configured for installation within a blade of a disintegration device, as described above. Each damper element 2700, 2800 includes a respective housing 2702, 2802 for housing and containing the components of the respective damper elements 2700, 2800. A first damper element 2700 has a substantially rectangular geometry (with curved corners) and a second damper element 2800 has a substantially circular geometry. The housings 2702, 2802 are configured to installation into blades of a disintegration device (e.g., as shown in FIG. 26).

The damper elements 2700, 2800 each include a mass element 2704, 2804 movably mounted within the housings 2702, 2802. The mass element 2704, 2804 is arranged between a mounting element 2706, 2806 and a contact element 2708, 2808. The mounting elements 2706, 2806 are configured to apply a force upon the respective mass element 2704, 2804 toward the contact elements 2708, 2808. As such, a frictional contact may be achieved between the respective mass element 2704, 2804 and the contact elements 2708, 2808. The mass elements 2704, 2804 may be arranged with one or more limit stops 2710, 2810 within the respective housings 2702, 2802. The limit stops 2710, 2810 may include optional stiffness or hydraulic elements for damping of the movement of the mass elements 2704, 2804,

Furthermore, the limit stops 2710, 2810 may prevent the mass elements 2704, 2804 from being stuck in one edge of the housing 2702, 2802. The limit stops 2710, 2810 can be configured with springs or other elements to avoid damage to the mass elements 2704, 2804 and to urge the mass elements 2704, 2804 toward a middle or rest position relative to the housing. In some embodiments, it may be beneficial to optimize a spring stiffness and/or gap in the housing 2702, 2802 to allow the mass elements 2704, 2804 to move within the housing 2702, 2802. The damper elements 2700, 2800 may be arranged as inserts (e.g., the housing 2702, 2802 is configured for installation). The insertable damper elements 2700, 2800 may be installed such that the mass elements 2704, 2804 are placed at a position of high radius with respect to an axis of a drilling system, to increase the rotational inertia.

The mounting element 2706, 2806 are configured to apply a normal force upon the mass elements 2704, 2804 (e.g., a force that is normal to mounting element 2706, 2806 or mass elements 2704, 2804). For example, the mounting element 2706, 2806 may be arranged as spring shells to urge the mass elements 2704, 2804 into contact with the contact element 2708, 2808. Furthermore, the mounting elements 2706, 2806 and/or the contact elements 2708, 2808 can be configured to control a tangential movement of the mass elements 2704, 2804 to enable damping of HFTO. In some embodiments, the mounting elements 2706, 2806 urge the mass elements 2704, 2804 into contact with the contact element 2708, 2808 to generate a friction force. The friction force is applied, for example, through a material that is beneficial with respect to the friction coefficient and the expected wear that should be as low as possible.

In accordance with embodiments of the present disclosure, integration of damping into the drill bit or other location along the string (e.g., at or in a BHA) may be achieved. The damping may be applied by any axial, tangential, and/or radial force or corresponding torque that is able to dissipate energy. In case of coupled modes, damping forces in an axial direction is also able to dissipate energy from the torsional direction. Coupling could also be achieved kinematically, such as, through the bit-rock interaction. As described for friction damping, contacting surfaces applied with a friction coefficient and normal force may be optimized and/or selected for damping one or more critical modes. In some embodiments, beneficial materials or designs may be employed to prevent wear (e.g., copper or polycrystalline diamond cutters). Multiple contacts with different properties could be used to tune the system to a beneficial friction coefficient or characteristic.

Another form of damping that may be employed is hydraulic damping. Such hydraulic damping may be implemented through a system, whether in the bit blades, or arranged about or in other locations of a drill bit or disintegration device or along a BHA or downhole string. One example of a hydraulic damper is shown and described in commonly owned U.S. Patent Application No. 62/899,291, entitled “Viscous Vibration Damping of Torsional Oscillation” which is incorporated herein by reference in its entirety. In some such embodiments, a viscous fluid (e.g., viscous fluid in chambers) may be arranged and installed in similar locations as described above. In some such applications, the (shear) stresses in the fluid between an inertia ring/mass and the drill bit/drilling system may be selected to achieve a (damping) force that acts in the direction of the tangential acceleration and associated harmonic movement to damp torsional oscillations, such as HFTO. In the case of ring shearing, the fluid provides a damping force between the inertia ring/mass and the drill bit. In this case, the ring may require a closed housing and, potentially, a well-defined geometry of the gaps between the ring and the housing. In hydraulic damping, the viscous damping forces are sensitive to parameter changes of the gaps and the viscous fluid. Therefore, a temperature insensitive fluid or a fluid that is less sensitive to temperature may be preferred. Fluids with different shear stresses as a function of the shear rate can be used to achieve a beneficial behavior. Some such example fluids include, without limitation, Newtonian fluids, dilatant (e.g., shear-thickening fluids), pseudoplastic, Bingham plastic, Bingham pseudoplastic fluids, etc. Advantageously, solids may be added to the fluid to achieve dispersive behavior of the fluid.

Further, in some embodiments, magnetic damping can be employed. Magnetic damping may be achieved by a permanent magnet (e.g., mounted on an inertia ring/mass) that is allowed to move relative to a coil and can be used to damp HFTO. Depending on the magnetic principle, the damping force characteristic is similar to hydraulic (e.g., eddy current) or friction (Hysteresis) forces. In some such configurations, the force would act in the direction of the tangential acceleration or any other direction that is able to lead to damping in the circumferential direction or the direction that should be damped.

Furthermore, in some embodiments, piezoelectric damping principles may be employed to prevent torsional oscillations, such as HFTO at the drill bit or in the drill string. A piezoelectric material that is connected to an inertia ring/mass on one side and to a portion of a downhole string on the other side can be used. The electrodes of the piezoelectric material can be connected to a circuit incorporating coils, resistors, and capacitances or semi-active or active components. A combination of the electrical components can be used to achieve beneficial damping characteristics between the inertia ring/mass and the components of a downhole string. A circuit could be adjusted to natural frequency of the system to work as a tuned damper (i.e., for one or more desired modes). A resistor could be arranged to directly dissipate energy if the piezoelectric stack is deformed by the relative force between the inertia ring/mass and the downhole string component. Additionally, the stiffness of the piezoelectric material and the inertia ring/mass could be tuned to a specific frequency as well. The electrodes of the piezoelectric material can be arranged to damp torsional vibrations. The direction of the damping forces can be different from the direction of the electrodes using the beneficial transformation effect from mechanical force-to-electrical signal that is suggested by the design of the piezoelectric actor. Well-known effects of piezoelectric coefficients are D₃₃ (in a direction of the force), D₃₁ (orthogonal to a direction of the force), and D₁₅ (shear stresses). The placement of the piezoelectric material can be placed to optimize or control the coupling between the mechanical and the electrical system for a specific mode or multiple mode shapes that are critical to HFTO. Further, various different materials that transfer mechanical force or stress or related loads into electrical signals can be used without departing from the scope of the present disclosure.

In addition, the internal damping and the resulting forces of materials can be used to reduce HFTO. That is, material damping can be achieved passively through the damping properties of high damping materials. Some such materials may include, without limitation, polymers, elastomers, rubber, etc. as well as the damping effect of multifunctional materials such as shape memory alloys. The material properties of some materials, such as shape memory alloys, can be actively influenced or controlled to achieve greater damping effects.

Other damping configurations are possible without departing from the scope of the present disclosure. For example, negative capacitances and semi-active components using switching techniques may be employed. Additional damping techniques and components may be used, and the above described embodiments and variations are provided for illustrative and explanatory purposes and are not intended to be limiting. All of the damping principles described herein can be adjusted to work as a tuned damper by adding mechanical springs adjusted to a specific frequency and by adding damping of any type. Further, one or more of the damping principles described herein (or other methods/mechanisms) can be combined in a multi-principle configuration. For example, ring-type dampers or tangential mass/inertia dampers may be installed within or attached to blades of a disintegration device or at other locations within the drill string. Furthermore, magnetic, hydraulic, friction, piezoelectric, and material damping forces and principles could be combined to achieve a robust damping effect, such as, for example, with respect to temperature.

As described above, one or more damper elements may be integrated into a drill bit or other disintegration device or at other locations along a downhole string or a BHA. For example, a bit damper may be positioned in or about a drill bit shank. In some configurations, a damper inertia ring could be lubricated by mud or covered by a sleeve design. In some configurations, a closed or uninterrupted ring may be employed. In other configurations, partial arcs may be assembled about a downhole string (e.g., could be mounted if ring cannot be assembled otherwise). In some such embodiments, two half-ring arcs may be employed. In other embodiments, more than two ring arcs may be used to form a complete hoop (circumferential) structure or less than a complete hoop (circumferential) structure, depending on the specific configuration that is implemented.

In some embodiments, a broken-ring structure may be employed, where discrete masses are arranged behind or adjacent to blades of a drill bit. In another example, a full ring-structure may be arranged adjacent the blades, but specific additional mass elements or features of the ring may be located relative to the specific blades of the drill bit. One such example may have a relatively thick ring at a location of the blades and lower thickness to allow a flow of cuttings to pass along the drill bit. Further, such rings may be located at other locations along a downhole string (e.g., BHA).

In some embodiments, limit stop may be provided and may prevent the inertia ring/mass to move freely about the circumference of a drill bit. Such limit stop may be provided in embodiments where the mass or higher mass is located behind or adjacent specific blades. In such cases, the limit stop may ensure that the inertia ring/mass remains in position relative to the blades or that the space in which the inertia ring/mass can move is limited.

It will be appreciated that friction-type damper elements of the present disclosure may employ radial and/or axial contact forces to achieve circumferential friction forces. Radial friction forces could be achieved by springs, pressure differences, or by an elastic design of an inertia ring or ring segments that may have two or more shells and may be pre-stressed. An axial normal force can be achieved by springs, pressure differences, and/or a weight of inertia ring/mass in a non-horizontal borehole. The material of the drill bit or other disintegration device may be steel or matrix composite, etc. In some embodiments, a bearing may be used in a radial direction to guarantee the movement of the inertia ring/mass. That is, a bearing may be provided to support circumferential or tangential movement of a damper element. An axial bearing may be used to decouple a potential normal force spring stack from rotational movement.

In some embodiments, alternatively from a ring-type damper element, or in combination therewith, damper elements may be implemented in or on blades of a disintegration device, a stabilizer, or in or on other components of the downhole string. In some such embodiments, the damper elements may be installed within housings that are screwed into the blades or recesses, under cover sleeves, or hatch covers. In some such configurations, one or more limit stops may be provided to prevent the damper elements from sticking or wedging into an edge or corner of the housing. Contact between the limit stop and a mass of the damper may be achieved using springs or other biasing elements or structures. In some embodiments, the spring stiffness or a gap in the housing may be selected to allow the mass of the damper to move within the housing, and thus enable damping of vibrations, as described above.

Adjustment elements that change the properties of the contact between the contacting elements in the downhole string may also be employed. For example, the normal force may be adjusted in a frictional contact. Further, the normal force, or the efficiency of the damper could be measured by load and acceleration or other vibration measurement sensing devices and adjusted based on these measurements.

Turning now to FIGS. 29A-29B, schematic illustrations of various types of mode-shape tuning elements are shown. FIG. 29A illustrates a set of example mode-shape-tuning elements 2902-2916 and FIG. 29B illustrates a downhole string 2920 (e.g., a BHA) having various mode-shape tuning elements 2922 (e.g., one or more of example mode-shape-tuning elements 2902-2916) installed thereon in order to tune or shift or reduce one or more maxima of a HFTO mode and thus enable damping of such HFTO vibrations within the downhole string 2920.

As shown in FIG. 29A, the mode-shape-tuning elements can have various dimensions. Each of mode-shape-tuning elements 2902-2916 has a different length and as shown, mode-shape-tuning elements 2902, 2904 have larger diameters and may be configured as weight-adding (i.e., heavy weight) mode-shape-tuning elements. In contrast, mode-shape-tuning elements 2906, 2908, 2910, 2912, 2914, 2916 are each narrower in diameter and may provide flexibility to a string to which they are attached (i.e., flex pipes). Mode-shape-tuning elements 2902-2916 may also be different in stiffness with respect to torsional twist. Also shown in FIG. 29A is a damper element sub 2918. A downhole string, such as the downhole string 2920 shown in FIG. 29B, may be configured with one or more mode-shape-tuning elements to enable shifting of one or more maxima of HFTO, and then enable improved damping to be provided by the damper element sub 2918.

As shown in FIG. 29B, the downhole string 2920 includes a motor 2924, one or more of mode-shape-tuning elements 2922 (which, for example, may be selected from the mode-shape-tuning elements 2902-2916 shown in FIG. 29A), a damper element sub 2918, a flex stabilization sub 2926, a set of drilling operation elements 2928 (e.g., measurement-while-drilling, logging-while-drilling, steering unit, etc.), and a disintegration device 2930 (e.g., a drill bit) disposed on an end thereof. The inclusion of the mode-shape-tuning elements 2922 in the downhole string 2920 enables tuning or shifting of one or more maxima of HFTO, and thus HFTO may be reduced where elements are located within the BHA that are sensitive with respect to HFTO. In addition, the inclusion of the mode-shape-tuning elements 2922 in the downhole string 2920 enables tuning or shifting of one or more maxima of HFTO, such as location of damping element sub 2918 may be optimized to damp such vibrations.

Accordingly, embodiments of the present disclosure are directed to locating a damping system, such as a ring-type damper or tangential damper, in a downhole string, such as at or in a drill bit or other disintegration device or at other specific locations in/on/along the downhole string. By locating the damping system at specific locations in/on/along the downhole string (e.g., in the steering unit, in the drill bit, or at other locations), improved damping of HFTO or other vibration modes may be achieved. Further, mode-shape tuning elements may be configured to enable placement of one or more damping elements at or near the end of the drill string, the end of the BHA, close to or at the drill bit (for example within 10 m of the drill bit, such as within 5 m of the drill bit or even within 3 m of the drill bit), at one or more maxima of or more mode shapes, or at one or more mode shape nodes to efficiently enable damping of one or more HFTO modes with one damping element. That is, as described herein, the maximum of multiple different HFTO modes may be aligned (tuned) to enable optimum placement of a damping element to damp one or more HFTO modes and thus reduce downhole system vibrations.

Embodiment 1: A system for damping high frequency torsional oscillations (HFTO) of a downhole system, the downhole system comprising: a downhole drilling system disposed at an end of the downhole system in operative connection with a drill bit; a damping system installed on the downhole drilling system, the damping system comprising at least one damper element configured to dampen at least one HFTO mode; and at least one mode-shape tuning element arranged on the drilling system, wherein the at least one mode-shape tuning element is configured and positioned on the drilling system to modify at least one of a shape of the HFTO mode, a frequency of the HFTO mode, an excitability of the HFTO mode, and a damping efficiency of the at least one damper element.

Embodiment 2: The system according to any preceding embodiment, wherein the at least one mode-shape tuning element is configured and positioned on the drilling system to modify the shape of the HFTO mode at a position of the at least one damper element.

Embodiment 3: The system according to any preceding embodiment, wherein the at least one mode-shape tuning element is selected based on at least one of a dimension of the at least one mode-shape tuning element, a material property of the at least one mode-shape tuning element, and a mechanical property of the at least one mode-shape tuning element.

Embodiment 4: The system according to any preceding embodiment, wherein the positioning of the at least one mode-shape tuning element on the drilling system is selected to at least one of modify the shape of the HFTO mode at a position of the at least one damper element and optimize the damping efficiency of the at least one damper element.

Embodiment 5: The system according to any preceding embodiment, further comprising a pool of mode-shape tuning elements from which the at least one mode-shape tuning element is selected for arrangement on the drilling system.

Embodiment 6: The system according to any preceding embodiment, wherein the at least one mode-shape tuning element is selected for the arrangement on the drilling system based on a numeric simulation of the HFTO of at least a portion of the downhole system.

Embodiment 7: The system according to any preceding embodiment, wherein at least one of the at least one damper element and the at least one mode-shape tuning element is positioned and/or selected based on a numeric inversion.

Embodiment 8: The system according to any preceding embodiment, wherein the damping system is at least one of a viscous damping system, a friction damping system, a hydraulic damping system, a magnetic damping system, and a piezoelectric damping system.

Embodiment 9: The system according to any preceding embodiment, further comprising an isolator.

Embodiment 10: The system according to any preceding embodiment, wherein the at least one damper element is arranged within 10 m of the drill bit.

Embodiment 11: A method for damping high frequency torsional oscillations (HFTO) of a downhole system, the method comprising: drilling with a downhole drilling system into the earth's subsurface, wherein the downhole drilling system is in operative connection with a drill bit and comprises a damping system that includes at least one damper element and at least one mode-shape tuning element arranged on the drilling system; configuring and positioning the at least one mode-shape tuning element on the drilling system to modify at least one of a shape of the HFTO mode, a frequency of the HFTO mode, an excitability of the HFTO mode, and a damping efficiency of the at least one damper element; and damping at least one HFTO mode with the at least one damper element.

Embodiment 12: The method according to any preceding embodiment, wherein the at least one mode-shape tuning element is configured and positioned on the drilling system to modify the shape of the HFTO mode at a position of the at least one damper element.

Embodiment 13: The method according to any preceding embodiment, further comprising selecting the at least one mode-shape tuning element for the arrangement in the drilling system based on at least one of a dimension of the at least one mode-shape tuning element, a material property of the at least one mode-shape tuning element, and a mechanical property of the at least one mode-shape tuning element.

Embodiment 14: The method according to any preceding embodiment, further comprising selecting a position of the at least one mode-shape tuning element on the drilling system to at least one of modify the shape of the HFTO mode at a position of the at least one damper element and optimize the damping efficiency of the at least one damper element.

Embodiment 15: The method according to any preceding embodiment, further comprising selecting the at least one mode-shape tuning element from a pool of mode-shape tuning elements for the arrangement in the drilling system.

Embodiment 16: The method according to any preceding embodiment, further comprising: executing a numeric simulation of the HFTO of at least a portion of the downhole system; and selecting the at least one mode-shape tuning element for the arrangement in the drilling system based on the numeric simulation of the HFTO of the portion of the downhole system.

Embodiment 17: The method according to any preceding embodiment, further comprising: executing a numeric inversion; and at least one of positioning and selecting at least one of the at least one damper element and the at least one mode-shape tuning element based on the numeric inversion.

Embodiment 18: The method according to any preceding embodiment, wherein the damping system is at least one of a viscous damping system, a friction damping system, a hydraulic damping system, a magnetic damping system, and a piezoelectric damping system.

Embodiment 19: The method according to any preceding embodiment, wherein the downhole drilling system further comprises an isolator.

Embodiment 20: The method according to any preceding embodiment, wherein the at least one damper element is arranged within 10 m of the drill bit.

Embodiment 21: A system for damping torsional oscillations of downhole systems, the system comprising: a drilling system comprising a bottomhole assembly disposed on the end of a drill string; at least one mode-shape tuning element arranged on the drilling system, the at least one mode-shape tuning element configured to shift the location of one or more maxima of a high-frequency torsional oscillations (HFTO) mode; and a damping system configured on the drilling system, the damping system comprising at least one damper element arranged more close to the shifted location of the one or more maxima then without the mode-shape tuning element arranged on the drilling system.

Embodiment 22: The system of any preceding embodiment, wherein the at least one mode-shape tuning element is a section of pipe having at least one of, a predefined dimension, such as a predefined length or predefined diameter, material and/or predefined mechanical properties, such as a predefined stiffness, predefined flexibility, predefined weight, predefined moment of inertia, predefined density, or predefined modulus of elasticity (shear and bulk) as well as predefined position/location.

Embodiment 23: The system of any preceding embodiment, wherein the damping system comprises a damping element sub that houses the at least one damper element.

Embodiment 24: The system of any preceding embodiment, wherein the damping system is configured to provide at least one of viscous damping, friction damping, hydraulic damping, piezoelectric damping, eddy current damping, and magnetic damping of torsional oscillations of the drilling system.

Embodiment 25: A method of damping torsional oscillations of a downhole system in a borehole, the method comprising: installing at least one mode-shape tuning element on a drilling system, the at least one mode-shape tuning element configured to shift the location of one or more maxima of a high-frequency torsional oscillations (HFTO) mode of the drilling system; and installing a damping system on the drilling system, the damping system comprising at least one damper element arranged more close to the shifted location of the maxima then without the mode-shape tuning element installed on the drilling system.

Embodiment 26: The method of any preceding embodiment, wherein the at least one mode-shape tuning element is a section of pipe having at least one of predefined dimensions, such as a predefined length or predefined diameter, material and/or predefined mechanical properties, such as a predefined stiffness, predefined flexibility, predefined weight, predefined moment of inertia, predefined density, or predefined modulus of elasticity (shear and bulk) as well as predefined position/location.

Embodiment 27: The method of any preceding embodiment, wherein the damping system comprises a damping element sub that houses the at least one damper element.

Embodiment 28: The method of any preceding embodiment, wherein the damping system is configured to provide at least one of viscous damping, friction damping, hydraulic damping, piezoelectric damping, eddy current damping, and magnetic damping of torsional oscillations of the drilling system.

In support of the teachings herein, various analysis components may be used including a digital and/or an analog system. For example, controllers, computer processing systems, and/or geo-steering systems as provided herein and/or used with embodiments described herein may include digital and/or analog systems. The systems may have components such as processors, storage media, memory, inputs, outputs, communications links (e.g., wired, wireless, optical, or other), user interfaces, software programs, signal processors (e.g., digital or analog) and other such components (e.g., such as resistors, capacitors, inductors, and others) to provide for operation and analyses of the apparatus and methods disclosed herein in any of several manners well-appreciated in the art. It is considered that these teachings may be, but need not be, implemented in conjunction with a set of computer executable instructions stored on a non-transitory computer readable medium, including memory (e.g., ROMs, RAMs), optical (e.g., CD-ROMs), or magnetic (e.g., disks, hard drives), or any other type that when executed causes a computer to implement the methods and/or processes described herein. These instructions may provide for equipment operation, control, data collection, analysis and other functions deemed relevant by a system designer, owner, user, or other such personnel, in addition to the functions described in this disclosure. Processed data, such as a result of an implemented method, may be transmitted as a signal via a processor output interface to a signal receiving device. The signal receiving device may be a display monitor or printer for presenting the result to a user. Alternatively, or in addition, the signal receiving device may be memory or a storage medium. It will be appreciated that storing the result in memory or the storage medium may transform the memory or storage medium into a new state (i.e., containing the result) from a prior state (i.e., not containing the result). Further, in some embodiments, an alert signal may be transmitted from the processor to a user interface if the result exceeds a threshold value.

Furthermore, various other components may be included and called upon for providing for aspects of the teachings herein. For example, a sensor, transmitter, receiver, transceiver, antenna, controller, optical unit, electrical unit, and/or electromechanical unit may be included in support of the various aspects discussed herein or in support of other functions beyond this disclosure.

The use of the terms “a” and “an” and “the” and similar referents in the context of describing the invention (especially in the context of the following claims) are to be construed to cover both the singular and the plural, unless otherwise indicated herein or clearly contradicted by context. Further, it should be noted that the terms “first,” “second,” and the like herein do not denote any order, quantity, or importance, but rather are used to distinguish one element from another. The modifier “about” used in connection with a quantity is inclusive of the stated value and has the meaning dictated by the context (e.g., it includes the degree of error associated with measurement of the particular quantity).

It will be recognized that the various components or technologies may provide certain necessary or beneficial functionality or features. Accordingly, these functions and features as may be needed in support of the appended claims and variations thereof, are recognized as being inherently included as a part of the teachings herein and a part of the present disclosure.

The teachings of the present disclosure may be used in a variety of well operations. These operations may involve using one or more treatment agents to treat a formation, the fluids resident in a formation, a borehole, and/or equipment in the borehole, such as production tubing. The treatment agents may be in the form of liquids, gases, solids, semi-solids, and mixtures thereof. Illustrative treatment agents include, but are not limited to, fracturing fluids, acids, steam, water, brine, anti-corrosion agents, cement, permeability modifiers, drilling muds, emulsifiers, demulsifiers, tracers, flow improvers etc. Illustrative well operations include, but are not limited to, hydraulic fracturing, stimulation, tracer injection, cleaning, acidizing, steam injection, water flooding, cementing, etc.

While embodiments described herein have been described with reference to various embodiments, it will be understood that various changes may be made, and equivalents may be substituted for elements thereof without departing from the scope of the present disclosure. In addition, many modifications will be appreciated to adapt a particular instrument, situation, or material to the teachings of the present disclosure without departing from the scope thereof. Therefore, it is intended that the disclosure is not limited to the particular embodiments disclosed as the best mode contemplated for carrying the described features, but that the present disclosure will include all embodiments falling within the scope of the appended claims.

Accordingly, embodiments of the present disclosure are not to be seen as limited by the foregoing description but are only limited by the scope of the appended claims. 

What is claimed is:
 1. A system for damping high frequency torsional oscillations (HFTO) of a downhole system, the downhole system comprising: a downhole drilling system disposed at an end of the downhole system in operative connection with a drill bit; a damping system installed on the downhole drilling system, the damping system comprising at least one damper element configured to dampen at least one HFTO mode; and at least one mode-shape tuning element arranged on the drilling system, wherein the at least one mode-shape tuning element is configured and positioned on the drilling system to modify at least one of a shape of the HFTO mode, a frequency of the HFTO mode, an excitability of the HFTO mode, and a damping efficiency of the at least one damper element.
 2. The system of claim 1, wherein the at least one mode-shape tuning element is configured and positioned on the drilling system to modify the shape of the HFTO mode at a position of the at least one damper element.
 3. The system of claim 1, wherein the at least one mode-shape tuning element is selected based on at least one of a dimension of the at least one mode-shape tuning element, a material property of the at least one mode-shape tuning element, and a mechanical property of the at least one mode-shape tuning element.
 4. The system of claim 1, wherein the positioning of the at least one mode-shape tuning element on the drilling system is selected to at least one of modify the shape of the HFTO mode at a position of the at least one damper element and optimize the damping efficiency of the at least one damper element.
 5. The system of claim 1, further comprising a pool of mode-shape tuning elements from which the at least one mode-shape tuning element is selected for arrangement on the drilling system.
 6. The system of claim 1, wherein the at least one mode-shape tuning element is selected for the arrangement on the drilling system based on a numeric simulation of the HFTO of at least a portion of the downhole system.
 7. The system of claim 6, wherein at least one of the at least one damper element and the at least one mode-shape tuning element is positioned and/or selected based on a numeric inversion.
 8. The system of claim 1, wherein the damping system is at least one of a viscous damping system, a friction damping system, a hydraulic damping system, a magnetic damping system, and a piezoelectric damping system.
 9. The system of claim 1, further comprising an isolator.
 10. The system of claim 1, wherein the at least one damper element is arranged within 10 m of the drill bit.
 11. A method for damping high frequency torsional oscillations (HFTO) of a downhole system, the method comprising: drilling with a downhole drilling system into the earth's subsurface, wherein the downhole drilling system is in operative connection with a drill bit and comprises a damping system that includes at least one damper element and at least one mode-shape tuning element arranged on the drilling system; configuring and positioning the at least one mode-shape tuning element on the drilling system to modify at least one of a shape of the HFTO mode, a frequency of the HFTO mode, an excitability of the HFTO mode, and a damping efficiency of the at least one damper element; and damping at least one HFTO mode with the at least one damper element.
 12. The method of claim 11, wherein the at least one mode-shape tuning element is configured and positioned on the drilling system to modify the shape of the HFTO mode at a position of the at least one damper element.
 13. The method of claim 11, further comprising selecting the at least one mode-shape tuning element for the arrangement in the drilling system based on at least one of a dimension of the at least one mode-shape tuning element, a material property of the at least one mode-shape tuning element, and a mechanical property of the at least one mode-shape tuning element.
 14. The method of claim 11, further comprising selecting a position of the at least one mode-shape tuning element on the drilling system to at least one of modify the shape of the HFTO mode at a position of the at least one damper element and optimize the damping efficiency of the at least one damper element.
 15. The method of claim 11, further comprising selecting the at least one mode-shape tuning element from a pool of mode-shape tuning elements for the arrangement in the drilling system.
 16. The method of claim 11, further comprising: executing a numeric simulation of the HFTO of at least a portion of the downhole system; and selecting the at least one mode-shape tuning element for the arrangement in the drilling system based on the numeric simulation of the HFTO of the portion of the downhole system.
 17. The method of claim 16, further comprising: executing a numeric inversion; and at least one of positioning and selecting at least one of the at least one damper element and the at least one mode-shape tuning element based on the numeric inversion.
 18. The method of claim 11, wherein the damping system is at least one of a viscous damping system, a friction damping system, a hydraulic damping system, a magnetic damping system, and a piezoelectric damping system.
 19. The method of claim 11, wherein the downhole drilling system further comprises an isolator.
 20. The method of claim 11, wherein the at least one damper element is arranged within 10 m of the drill bit. 